diff --git a/markdown/dreambooth/DreamBoothCN.md b/markdown/dreambooth/DreamBoothCN.md new file mode 100644 index 0000000000000000000000000000000000000000..3da4d286ecb0e9982359d63db45d13b86e093be1 --- /dev/null +++ b/markdown/dreambooth/DreamBoothCN.md @@ -0,0 +1,781 @@ +## (必读) 准备工作 + +- 点击右上角,Fork 这个 Notebook +- 鼠标悬停在运行按钮,或者点击右上角齿轮图标进入高级选项,确保「挂载 work 目录」为选中状态 +- 运行 Fork 过的 Notebook + +### 再次确认「挂载 work 目录」已经勾选 + +![](https://devrel.andfun.cn/devrel/posts/2023/01/c0ecc61d04bf4.gif) + + +```python +# 请确保 work 目录存在,不存在的话以下命令会报错。请关闭实例再重新创建。 +! ls /home/mw/work +``` + +## Hugging Face DreamBooth 编程马拉松大赛 🏆 + +基于 HF diffusion class 创作。 + +原文 https://github.com/huggingface/diffusion-models-class/tree/main/hackathon +译者 SuSung-boy@ 苏桑,经常倒腾图像的工业视觉算法工程师。 + +欢迎来到 DreamBooth 编程马拉松!在这场比赛中,您将通过 **在少量自己的图像上进行微调来得到具有个性化的 Stable Diffusion 模型**。为此,您将使用一项名为 [DreamBooth](https://arxiv.org/abs/2208.12242) 的技术,用户可以将主体(例如,您的宠物或喜爱的美食)植入模型的输出域,以便可以在提示中使用 **唯一标识符** 进行合成。 + +让我们开始吧! + +🚨 **进阶用户提示** + +本 Notebook 提供的代码是 🤗 Diffusers 中[官方训练脚本](https://github.com/huggingface/diffusers/tree/main/examples/dreambooth) 的简化版本,**运行本 Notebook 中的代码需要至少 14GB GPU vRAM**。该代码已经可以为大多数应用程序生成不错的模型,但如果您有超过 24GB vRAM 可用,我们建议您尝试高级功能,例如 class preservation 损失和微调文本编码器。 查看 🤗 Diffusers [文档](https://hf.co/docs/diffusers/training/dreambooth) 了解详情。 + +## DreamBooth 是什么? + +DreamBooth 是一项使用特定形式的微调来将新引入的概念传授给 Stable Diffusion 的技术。 + +Hugging Face 的这篇 [博客文章](https://huggingface.co/blog/dreambooth) 说明了使用 DreamBooth 微调 Stable Diffusion 的一些最佳实践。 + +DreamBooth 的工作方式如下: + +* 收集大约 10-20 张特定主体(例如您的狗狗)的输入图像,并定义一个唯一标识符 [V],它代指的即是您输入的主体。该标识符通常是一些像 `flffydog` 这样的虚构词,在推理时它会被植入不同的文本提示中来将主体置于不同的上下文中。 +* 通过提供图像和文本提示来微调扩散模型,例如给定文本提示 "A photo of a [V] dog",其中需包含唯一标识符 [V] 和类名(本例中为 "dog") +* (可选)采用特殊的 **class-specific prior preservation loss**, 它利用了模型在类上的语义先验,并通过在文本提示中注入类名来促使它生成属于同一主体类的多种实例。实际使用过程中,只有人脸做为主体才真正需要此步骤,而对于此次编程马拉松中要探索的主题,则可跳过此步骤。 + +DreamBooth 的技术概述如下图所示: + +![DreamBooth 的技术概述](https://cdn.kesci.com/upload/image/ro83zspjq5.png?imageView2/0/w/960/h/960) + +### DreamBooth 能做什么? + +除了将您的主体放在感兴趣的位置之外,DreamBooth 还可用于 _**文本引导视图合成**_, 您可以从不同的视角查看主体,如下例所示: + + +![Image Name](https://cdn.kesci.com/upload/image/ro84168ko.png?imageView2/0/w/960/h/960) + + +DreamBooth 还可用于修改主体的属性,例如颜色改变和动物混合! + + + +![Image Name](https://cdn.kesci.com/upload/image/ro843np7oe.png?imageView2/0/w/960/h/960) + + +以上就是使用 DreamBooth 做的一些很酷的事!既然我们已经大致了解了,让我们开始训练自己的模型吧! + +## 第 1 步:设置 + +**文生图的模型一般都很大**,因为网络的原因从 HuggingFace 主站直接下载速度比较慢。为了方便同学们使用,我们将模型文件做成了可以直接在本地挂载的 HeyWhale 数据集。 + +挂载数据集只需点击左边栏第三个数据集按钮,打开挂载数据面板。然后点击“修改” 按钮,选中“他人共享”里面的 Hackathon 数据集,确定即可。 + +最终结果如图所示: + +*注意:如果你成功挂载了 work 目录,这些数据集就默认挂载完成,通常这里无需额外操作。 + +![](https://cdn.kesci.com/upload/image/ro84bkw8in.png?imageView2/0/w/960/h/960) + +让我们来看一下挂载的数据集有哪些文件,执行下面的代码: + + +```python +%ls /home/mw/input/Hackathon6769/ +``` + + clip-vit-base-patch32/ stable-diffusion-v1-4/ + stable-diffusion-safety-checker/ + + +然后安装我们需要的依赖: + + +```python +%pip install -qqU diffusers transformers bitsandbytes accelerate ftfy datasets -i https://mirrors.cloud.tencent.com/pypi/simple +``` + + Note: you may need to restart the kernel to use updated packages. + + +然后因为兼容性的问题降级 `ipywidgets` 到某一个特定版本。如果你使用的是自己的机器可能无需这一步操作。 + + +```python +!pip install -qqU ipywidgets==7.6.3 -i https://mirrors.cloud.tencent.com/pypi/simple +``` + +安装完成后重新启动 Kernel,点击本 Notebook 菜单栏上的重启 Kernel 即可: + +![](https://devrel.andfun.cn/devrel/posts/2023/01/fbf8ac782e754.png) + +接下来让我们登录 Hugging Face: + + +```python +%%capture +!sudo apt -qq install git-lfs +!git config --global credential.helper store +``` + + +```python +from huggingface_hub import notebook_login +notebook_login() +``` + + Token is valid. + Your token has been saved in your configured git credential helpers (store). + Your token has been saved to /home/mw/.huggingface/token + Login successful + + +这一步需要大家访问 [Hugging Face 的 Token 设置](https://hf.co/settings/tokens) 页面,并创建一个有可写 (WRITE) 权限的 token ,然后点击右边按钮把内容复制进来。 + + +![Image Name](https://cdn.kesci.com/upload/image/ro85de2kym.png?imageView2/0/w/960/h/960) + + +最后让我们定义一些后面会用到的常量。 + + +```python +MODEL_SD_PATH = '/home/mw/input/Hackathon6769/stable-diffusion-v1-4' +MODEL_CLIP_VIT_PATH = '/home/mw/input/Hackathon6769/clip-vit-base-patch32' +MODEL_SD_SAFETY_PATH = '/home/mw/input/Hackathon6769/stable-diffusion-safety-checker' +``` + +## 第 2 步:选择主题 + +本次大赛包含5个 **主题** (theme),每个主题将征集属于以下类别的模型: + +- 动物 🐨 (`animal`): 使用此主题生成您的宠物或喜爱的动物在雅典卫城游玩、在游泳或在太空中飞行的图像。 +- 科学 🔬 (`science`): 使用此主题生成星系、蛋白质或任何自然科学和医学领域的酷毙的合成图像。 +- 食物 🍔 (`food`): 使用此主题在您最喜欢的美味佳肴图像上微调您自己的 Stable Diffusion。 +- 风景 🏔 (`landscape`): 使用此主题生成您最喜欢的山脉、湖泊或花园的美丽风景图像。 +- 通用 🔥 (`wildcard`): 此主题无限定的类别,您可以为选择的任何类别创建 Stable Diffusion 模型! + +我们将为每个主题的前 3 名喜爱度最高的模型颁发奖品,我们鼓励您提交尽可能多的模型!请从以下几个类别中选一个吧。 + + +```python +# options=["animal", "science", "food", "landscape", "wildcard"], +options = "wildcard" +theme = options +``` + +## 第 3 步:创建图像数据集并上传到 work 目录下 + +选定主题后,下一步是 **为该主题创建图像数据集** 并将其上传到 work 目录: + +* 在 work 目录下创建一个子文件夹,用于存放照片,名称随意。 +* 确定您希望植入模型的主体,然后需要准备大约 **10-20 张主体图像**。这些图像可以是您拍摄的照片或从 [Unsplash](https://unsplash.com/) 等平台下载的图片。更或者,您可以查看 Hugging Face Hub 上的任何 [图像数据集](https://hf.co/datasets?task_categories=task_categories:image-classification&sort=downloads) 来获取灵感。 +* 为获得最佳效果,我们建议使用 **不同角度和视角** 拍摄的主体图像 + +到左侧边栏找到「文件树」,在 work 目录下新建一个文件夹,上传自己的主体图像用于微调: + +![](https://devrel.andfun.cn/devrel/posts/2023/01/4c2f1c0fce0e6.gif) + +本 demo 里训练的是 Flutter 的吉祥物 Dash,因此我在 `work` 目录下创建了一个 `dashdash` 的文件夹。 + + +```python +# 让我们来看一下这些照片,dashdash 是我的 dart 玩偶的名字 +! ls /home/mw/work/dashdash +``` + + +```python +DATA_DIR = "/home/mw/work/dashdash" +``` + + +```python +from datasets import load_dataset + +dataset = load_dataset("imagefolder", data_dir=DATA_DIR) +dataset = dataset['train'] +``` + + Using custom data configuration default-ab024aecf581f3e7 + Found cached dataset imagefolder (/home/mw/.cache/huggingface/datasets/imagefolder/default-ab024aecf581f3e7/0.0.0/37fbb85cc714a338bea574ac6c7d0b5be5aff46c1862c1989b20e0771199e93f) + + + + 0%| | 0/1 [00:00 + + + +现在我们有了自己的数据集,让我们定义一个辅助函数来可视化查看一些图像: + + +```python +from PIL import Image + +def image_grid(imgs, rows, cols): + assert len(imgs) == rows * cols + w, h = imgs[0].size + grid = Image.new("RGB", size=(cols * w, rows * h)) + grid_w, grid_h = grid.size + for i, img in enumerate(imgs): + grid.paste(img, box=(i % cols * w, i // cols * h)) + return grid + +num_samples = 4 +image_grid(dataset["image"][:num_samples], rows=1, cols=num_samples) +``` + +这些图像如果看起来不错,您可以继续下一步 —— 创建 PyTorch 数据集以使用 DreamBooth 进行训练。 + +### 创建训练数据集 + +要为我们的图像创建训练集,需要一些组件: + +* **实例提示** : 用于在训练开始时预热模型。大多数情况下,使用一张「标识符 + 类别名词」的照片效果已足够好,例如为我们可爱的柯基图片写上提示: "一张柯柯基狗的照片"。 + * **注意:** 建议您选择一个独特的/虚构词来描述您的主体,如 `柯柯基`。以此确保模型词汇表中的常用词不会被覆盖。 +* **分词器** : 用于将实例提示转换为输入 ID,并且可以将其提供给 Stable Diffusion 的文本编码器。 +* 一组 **图像变换** : 尤其是将图像缩放至通用形状,以及将像素值归一化至通用均值和标准分布。 + +根据以上描述,让我们从定义实例提示开始: + + +```python +name_of_your_concept = "dashdash" # 根据您的主体修改,我这里把 dash 称之为 dashdash +type_of_thing = "toy" # 根据您的主体修改 +instance_prompt = f"a photo of {name_of_your_concept} {type_of_thing}" +print(f"Instance prompt: {instance_prompt}") +``` + + Instance prompt: a photo of dashdash toy + + +接下来,我们需要创建一个 PyTorch `Dataset` 类, 并实现 `__len__` 和 `__getitem__` 方法: + + +```python +from torch.utils.data import Dataset +from torchvision import transforms + + +class DreamBoothDataset(Dataset): + def __init__(self, dataset, instance_prompt, tokenizer, size=512): + self.dataset = dataset + self.instance_prompt = instance_prompt + self.tokenizer = tokenizer + self.size = size + self.transforms = transforms.Compose( + [ + transforms.Resize(size), + transforms.CenterCrop(size), + transforms.ToTensor(), + transforms.Normalize([0.5], [0.5]), + ] + ) + + def __len__(self): + return len(self.dataset) + + def __getitem__(self, index): + example = {} + image = self.dataset[index]["image"] + example["instance_images"] = self.transforms(image) + example["instance_prompt_ids"] = self.tokenizer( + self.instance_prompt, + padding="do_not_pad", + truncation=True, + max_length=self.tokenizer.model_max_length, + ).input_ids + return example +``` + +很好,现在让我们加载与原始 Stable Diffusion 模型的文本编码器关联的 CLIP 分词器,然后检查上一步是否生效,然后创建训练数据集: + + +```python +from transformers import CLIPTokenizer + +# 用来微调的 Stable Diffusion 检查点 +model_id = MODEL_SD_PATH +tokenizer = CLIPTokenizer.from_pretrained( + model_id, + subfolder="tokenizer", +) + +train_dataset = DreamBoothDataset(dataset, instance_prompt, tokenizer) +train_dataset[0] +``` + + + + + {'instance_images': tensor([[[ 0.6941, 0.6941, 0.6941, ..., 0.3647, 0.3647, 0.3647], + [ 0.6941, 0.7020, 0.6941, ..., 0.3647, 0.3647, 0.3647], + [ 0.6863, 0.6863, 0.6863, ..., 0.3647, 0.3647, 0.3569], + ..., + [ 0.5216, 0.5294, 0.5216, ..., 0.5529, 0.5451, 0.5451], + [ 0.5216, 0.5216, 0.5294, ..., 0.5529, 0.5451, 0.5529], + [ 0.5216, 0.5373, 0.5373, ..., 0.5451, 0.5529, 0.5608]], + + [[ 0.5529, 0.5529, 0.5529, ..., -0.0275, -0.0275, -0.0275], + [ 0.5529, 0.5608, 0.5529, ..., -0.0275, -0.0275, -0.0275], + [ 0.5451, 0.5451, 0.5451, ..., -0.0275, -0.0275, -0.0353], + ..., + [ 0.5216, 0.5294, 0.5216, ..., 0.5608, 0.5529, 0.5529], + [ 0.5216, 0.5216, 0.5294, ..., 0.5608, 0.5529, 0.5608], + [ 0.5216, 0.5373, 0.5373, ..., 0.5529, 0.5608, 0.5686]], + + [[ 0.6784, 0.6784, 0.6784, ..., -0.6000, -0.6000, -0.6000], + [ 0.6784, 0.6863, 0.6784, ..., -0.5922, -0.5922, -0.5922], + [ 0.6706, 0.6706, 0.6706, ..., -0.5843, -0.5843, -0.5922], + ..., + [ 0.5843, 0.5922, 0.5843, ..., 0.5765, 0.5686, 0.5686], + [ 0.5843, 0.5843, 0.5922, ..., 0.5765, 0.5686, 0.5765], + [ 0.5843, 0.6000, 0.6000, ..., 0.5686, 0.5765, 0.5843]]]), + 'instance_prompt_ids': [49406, 320, 1125, 539, 13858, 10206, 5988, 49407]} + + + +## 第 4 步:定义数据整理器 + +现在我们有了一个训练数据集,接下来我们需要定义一个数据整理器。数据整理器是一个函数,它实现的功能是:收集一个批次数据中的元素、应用一些逻辑来构成单个张量、提供给模型训练等。如果您想了解更多信息,可以观看 [Hugging Face 的视频课程](hf.co/course)。 + +对于 DreamBooth,我们定义的数据整理器需要为模型提供两个部分:分词器的输入 ID、图像的像素值堆叠张量。具体函数代码如下所示: + + +```python +import torch + +def collate_fn(examples): + input_ids = [example["instance_prompt_ids"] for example in examples] + pixel_values = [example["instance_images"] for example in examples] + pixel_values = torch.stack(pixel_values) + pixel_values = pixel_values.to(memory_format=torch.contiguous_format).float() + + input_ids = tokenizer.pad( + {"input_ids": input_ids}, padding=True, return_tensors="pt" + ).input_ids + + batch = { + "input_ids": input_ids, + "pixel_values": pixel_values, + } + return batch +``` + +## 第 5 步:加载 Stable Diffusion 管道组件 + +到此我们已经准备好训练所需的大部分组件了!如 Stable Diffusion 第 3 单元 Notebook 中所示,一个管道包含多个模型: + +* 文本编码器: 用于将文本提示转换为嵌入矩阵。这里我们使用 CLIP,因为它是用于训练 Stable Diffusion v1-4 的编码器 +* VAE (变分自动编码器, variational autoencoder): 用于将图像转换为压缩表征(隐式表征),并在推理时解压缩 +* UNet: 用于在隐式 VAE 中去噪 + +我们可以使用 🤗 Diffusers 和 🤗 Transformers 库加载上述所有组件,如下代码所示: + + + +```python +from diffusers import AutoencoderKL, UNet2DConditionModel +from transformers import CLIPFeatureExtractor, CLIPTextModel + +text_encoder = CLIPTextModel.from_pretrained(model_id, subfolder="text_encoder") +vae = AutoencoderKL.from_pretrained(model_id, subfolder="vae") +unet = UNet2DConditionModel.from_pretrained(model_id, subfolder="unet") +feature_extractor = CLIPFeatureExtractor.from_pretrained(MODEL_CLIP_VIT_PATH) +``` + +## 第 6 步:微调模型 + +有趣的一步来了!使用 DreamBooth 训练自己的模型!如 [Hugging Face 的博客文章](https://huggingface.co/blog/dreambooth) 所描述的那样,需要手动调整的最重要的超参数是学习率和训练次数。 + +通常,较低的学习率和较长的训练次数可以获得更好的结果。下面设置的初始值是一个不错的训练起点,但您可能仍然需要根据您的数据集调整它们: + + +```python +learning_rate = 2e-06 +max_train_steps = 400 +``` + +接下来,将训练需要的其他超参数包装在 `Namespace` 对象中,来使配置和训练更简单: + + +```python +from argparse import Namespace + +OUTPUT_DIR = "/home/mw/work/my-dreambooth" +args = Namespace( + pretrained_model_name_or_path=model_id, + resolution=512, # Reduce this if you want to save some memory + train_dataset=train_dataset, + instance_prompt=instance_prompt, + learning_rate=learning_rate, + max_train_steps=max_train_steps, + train_batch_size=1, + gradient_accumulation_steps=1, # Increase this if you want to lower memory usage + max_grad_norm=1.0, + gradient_checkpointing=True, # set this to True to lower the memory usage. + use_8bit_adam=True, # use 8bit optimizer from bitsandbytes + seed=3434554, + sample_batch_size=2, + output_dir=OUTPUT_DIR, # where to save the pipeline +) +``` + +最后要定义一个 `training_function()` 函数,它包装了一些训练逻辑,并且可以传递给 🤗 Accelerate 库来处理 1 个或多个 GPU 上的训练。如果这是您第一次使用 🤗 Accelerate,请观看我们官方的 Bilibili 频道视频以快速了解它的功能:[Supercharge your PyTorch training loop with Accelerate](https://www.bilibili.com/video/BV1gD4y157ee/) (带中英文字幕)。 + + +当我们从头开始训练自己的扩散模型时,这些细节与我们在第 1 和第 2 单元中看到的类似: + + +```python +import math + +import torch.nn.functional as F +from accelerate import Accelerator +from accelerate.utils import set_seed +from diffusers import DDPMScheduler, PNDMScheduler, StableDiffusionPipeline +from diffusers.pipelines.stable_diffusion import StableDiffusionSafetyChecker +from torch.utils.data import DataLoader +from tqdm.auto import tqdm + + +def training_function(text_encoder, vae, unet): + + accelerator = Accelerator( + gradient_accumulation_steps=args.gradient_accumulation_steps, + ) + + set_seed(args.seed) + + if args.gradient_checkpointing: + unet.enable_gradient_checkpointing() + + # 使用 8 位 Adam 优化器以降低内存占用,或者在 16GB GPU 微调模型 + if args.use_8bit_adam: + import bitsandbytes as bnb + optimizer_class = bnb.optim.AdamW8bit + else: + optimizer_class = torch.optim.AdamW + + optimizer = optimizer_class( + unet.parameters(), # 仅优化 UNet + lr=args.learning_rate, + ) + + noise_scheduler = DDPMScheduler( + beta_start=0.00085, + beta_end=0.012, + beta_schedule="scaled_linear", + num_train_timesteps=1000, + ) + + train_dataloader = DataLoader( + args.train_dataset, + batch_size=args.train_batch_size, + shuffle=True, + collate_fn=collate_fn, + ) + + unet, optimizer, train_dataloader = accelerator.prepare( + unet, optimizer, train_dataloader + ) + + # 将 text_encode 和 VAE 转移到 gpu + text_encoder.to(accelerator.device) + vae.to(accelerator.device) + + # 我们需要重新计算我们的总训练次数,因为数据加载器的大小可能发生改变。 + num_update_steps_per_epoch = math.ceil( + len(train_dataloader) / args.gradient_accumulation_steps + ) + num_train_epochs = math.ceil(args.max_train_steps / num_update_steps_per_epoch) + + # 训练! + total_batch_size = ( + args.train_batch_size + * accelerator.num_processes + * args.gradient_accumulation_steps + ) + # 每台机器仅显示一次进度条 + progress_bar = tqdm( + range(args.max_train_steps), disable=not accelerator.is_local_main_process + ) + progress_bar.set_description("Steps") + global_step = 0 + + for epoch in range(num_train_epochs): + unet.train() + for step, batch in enumerate(train_dataloader): + with accelerator.accumulate(unet): + # 转换图像至隐式空间 + with torch.no_grad(): + latents = vae.encode(batch["pixel_values"]).latent_dist.sample() + latents = latents * 0.18215 + + # 采样要添加到隐式空间的噪声样本 + noise = torch.randn(latents.shape).to(latents.device) + bsz = latents.shape[0] + # 为每张图像采样随机时间步 + timesteps = torch.randint( + 0, + noise_scheduler.config.num_train_timesteps, + (bsz,), + device=latents.device, + ).long() + + # 根据每个时间步的噪声幅度,将噪声添加到隐式空间 + # (即前向扩散过程) + noisy_latents = noise_scheduler.add_noise(latents, noise, timesteps) + + # 获取用于条件调节的文本嵌入 + with torch.no_grad(): + encoder_hidden_states = text_encoder(batch["input_ids"])[0] + + # 预测噪声残差 + noise_pred = unet( + noisy_latents, timesteps, encoder_hidden_states + ).sample + loss = ( + F.mse_loss(noise_pred, noise, reduction="none") + .mean([1, 2, 3]) + .mean() + ) + + accelerator.backward(loss) + if accelerator.sync_gradients: + accelerator.clip_grad_norm_(unet.parameters(), args.max_grad_norm) + optimizer.step() + optimizer.zero_grad() + + # 检查加速器是否在幕后执行了优化 + if accelerator.sync_gradients: + progress_bar.update(1) + global_step += 1 + + logs = {"loss": loss.detach().item()} + progress_bar.set_postfix(**logs) + + if global_step >= args.max_train_steps: + break + + accelerator.wait_for_everyone() + + # 使用经训练的模块,创建管道并保存。 + if accelerator.is_main_process: + print(f"Loading pipeline and saving to {args.output_dir}...") + scheduler = PNDMScheduler( + beta_start=0.00085, + beta_end=0.012, + beta_schedule="scaled_linear", + skip_prk_steps=True, + steps_offset=1, + ) + pipeline = StableDiffusionPipeline( + text_encoder=text_encoder, + vae=vae, + unet=accelerator.unwrap_model(unet), + tokenizer=tokenizer, + scheduler=scheduler, + safety_checker=StableDiffusionSafetyChecker.from_pretrained( + MODEL_SD_SAFETY_PATH + ), + feature_extractor=feature_extractor, + ) + pipeline.save_pretrained(args.output_dir) +``` + +现在我们已经定义了训练所需的所有函数,开始训练吧!根据您的数据集的大小和 GPU 的类型,可能需要 5 分钟到 1 小时不等的时间才能运行: + + +```python +from accelerate import notebook_launcher + +num_of_gpus = 1 # 以及您拥有的 GPU 数量修改此项 +notebook_launcher( + training_function, args=(text_encoder, vae, unet), num_processes=num_of_gpus +) +``` + + Launching training on one GPU. + + ===================================BUG REPORT=================================== + Welcome to bitsandbytes. For bug reports, please submit your error trace to: https://github.com/TimDettmers/bitsandbytes/issues + For effortless bug reporting copy-paste your error into this form: https://docs.google.com/forms/d/e/1FAIpQLScPB8emS3Thkp66nvqwmjTEgxp8Y9ufuWTzFyr9kJ5AoI47dQ/viewform?usp=sf_link + ================================================================================ + CUDA_SETUP: WARNING! libcudart.so not found in any environmental path. Searching /usr/local/cuda/lib64... + CUDA SETUP: CUDA runtime path found: /usr/local/cuda/lib64/libcudart.so + CUDA SETUP: Highest compute capability among GPUs detected: 7.5 + CUDA SETUP: Detected CUDA version 116 + CUDA SETUP: Loading binary /opt/conda/lib/python3.9/site-packages/bitsandbytes/libbitsandbytes_cuda116.so... + + + /opt/conda/lib/python3.9/site-packages/bitsandbytes/cuda_setup/main.py:134: UserWarning: WARNING: The following directories listed in your path were found to be non-existent: {PosixPath('/usr/local/nvidia/lib'), PosixPath('/usr/local/nvidia/lib64')} + warn(msg) + /opt/conda/lib/python3.9/site-packages/bitsandbytes/cuda_setup/main.py:134: UserWarning: /usr/local/nvidia/lib:/usr/local/nvidia/lib64 did not contain libcudart.so as expected! Searching further paths... + warn(msg) + /opt/conda/lib/python3.9/site-packages/bitsandbytes/cuda_setup/main.py:134: UserWarning: WARNING: The following directories listed in your path were found to be non-existent: {PosixPath('//172.16.252.1'), PosixPath('tcp'), PosixPath('443')} + warn(msg) + /opt/conda/lib/python3.9/site-packages/bitsandbytes/cuda_setup/main.py:134: UserWarning: WARNING: The following directories listed in your path were found to be non-existent: {PosixPath('//matplotlib_inline.backend_inline'), PosixPath('module')} + warn(msg) + + + + 0%| | 0/400 [00:00 + + + + +这是一个使用了 [这个模型](https://huggingface.co/sd-dreambooth-library/mr-potato-head) 的例子。该模型的训练使用了 5 张著名的儿童玩具 "Mr Potato Head"的照片。 + +首先,让我们来加载这个管道。这些代码会自动从 Hub 下载模型权重等需要的文件。由于这个只有一行的 demo 需要下载数 GB 的数据,因此你可以跳过此单元格,只需欣赏样例输出即可! + + +```python +from diffusers import StableDiffusionPipeline + +# Check out https://huggingface.co/sd-dreambooth-library for loads of models from the community +model_id = "sd-dreambooth-library/mr-potato-head" + +# Load the pipeline +pipe = StableDiffusionPipeline.from_pretrained(model_id, torch_dtype=torch.float16).to( + device +) +``` + + + Fetching 15 files: 0%| | 0/15 [00:00
+ +$q (\mathbf {x}_t \vert \mathbf {x}_{t-1}) = \mathcal {N}(\mathbf {x}_t; \sqrt {1 - \beta_t} \mathbf {x}_{t-1}, \beta_t\mathbf {I}) \quad +q (\mathbf {x}_{1:T} \vert \mathbf {x}_0) = \prod^T_{t=1} q (\mathbf {x}_t \vert \mathbf {x}_{t-1})$

+ + +这就是说,我们取 $x_{t-1}$, 给他一个 $\sqrt {1 - \beta_t}$ 的系数,然后加上带有 $\beta_t$ 系数的噪声。 这里 $\beta$ 是根据一些管理器来为每一个 t 设定的,来决定每一个迭代周期中添加多少噪声。 现在,我们不想把这个推演进行 500 次来得到 $x_{500}$,所以我们用另一个公式来根据给出的 $x_0$ 计算得到任意 t 时刻的 $x_t$:

+ +$\begin {aligned} +q (\mathbf {x}_t \vert \mathbf {x}_0) &= \mathcal {N}(\mathbf {x}_t; \sqrt {\bar {\alpha}_t} \mathbf {x}_0, {(1 - \bar {\alpha}_t)} \mathbf {I}) +\end {aligned}$ where $\bar {\alpha}_t = \prod_{i=1}^T \alpha_i$ and $\alpha_i = 1-\beta_i$

+ +数学符号看起来总是很可怕!好在有管理器来为我们完成这些运算。我们可以画出 $\sqrt {\bar {\alpha}_t}$ (标记为`sqrt_alpha_prod`) 和 $\sqrt {(1 - \bar {\alpha}_t)}$ (标记为`sqrt_one_minus_alpha_prod`) 来看一下输入 (x) 与噪声是如何在不同迭代周期中量化和叠加的: + + +```python +plt.plot(noise_scheduler.alphas_cumprod.cpu() ** 0.5, label=r"${\sqrt{\bar{\alpha}_t}}$") +plt.plot((1 - noise_scheduler.alphas_cumprod.cpu()) ** 0.5, label=r"$\sqrt{(1 - \bar{\alpha}_t)}$") +plt.legend(fontsize="x-large"); +``` + +**练习:** 你可以探索一下使用不同的 beta_start 时曲线是如何变化的,beta_end 与 beta_schedule 可以通过以下注释内容来修改: + + +```python +# One with too little noise added: +# noise_scheduler = DDPMScheduler(num_train_timesteps=1000, beta_start=0.001, beta_end=0.004) +# The 'cosine' schedule, which may be better for small image sizes: +# noise_scheduler = DDPMScheduler(num_train_timesteps=1000, beta_schedule='squaredcos_cap_v2') +``` + +不论你选择了哪一个管理器 (调度器),我们现在都可以使用`noise_scheduler.add_noise`功能来添加不同程度的噪声,就像这样: + + +```python +timesteps = torch.linspace(0, 999, 8).long().to(device) +noise = torch.randn_like(xb) +noisy_xb = noise_scheduler.add_noise(xb, noise, timesteps) +print("Noisy X shape", noisy_xb.shape) +show_images(noisy_xb).resize((8 * 64, 64), resample=Image.NEAREST) +``` + + Noisy X shape torch.Size ([8, 3, 32, 32]) + + + + + + +![png](01_introduction_to_diffusers_CN_files/01_introduction_to_diffusers_CN_40_1.png) + + + + +再来,在这里探索使用这里不同噪声管理器和预设参数带来的效果。 [This video](https://www.youtube.com/watch?v=fbLgFrlTnGU) 这个视频很好的解释了一些上述数学运算的细节,同时也是对此类概念的一个很好引入介绍。 + +## 步骤 4:定义模型 + +现在我们来到了核心部分:模型本身。 + +大多数扩散模型使用的模型结构都是一些 [U-net] 的变形 (https://arxiv.org/abs/1505.04597) 也是我们在这里会用到的结构。 + +![](https://huggingface.co/datasets/huggingface/documentation-images/resolve/main/unet-model.png) + +概括来说: +- 输入模型中的图片经过几个由 ResNetLayer 构成的层,其中每层都使图片尺寸减半。 +- 之后在经过同样数量的层把图片升采样。 +- 其中还有对特征在相同位置的上、下采样层残差连接模块。 + +模型一个关键特征既是,输出图片尺寸与输入图片相同,这正是我们这里需要的。 + +Diffusers 为我们提供了一个易用的`UNet2DModel`类,用来在 PyTorch 创建所需要的结构。 + +我们来使用 U-net 为我们生成目标大小的图片吧。 +注意这里`down_block_types`对应下采样模块 (上图中绿色部分), 而`up_block_types`对应上采样模块 (上图中红色部分): + + +```python +from diffusers import UNet2DModel + +# Create a model +model = UNet2DModel( + sample_size=image_size, # the target image resolution + in_channels=3, # the number of input channels, 3 for RGB images + out_channels=3, # the number of output channels + layers_per_block=2, # how many ResNet layers to use per UNet block + block_out_channels=(64, 128, 128, 256), # More channels -> more parameters + down_block_types=( + "DownBlock2D", # a regular ResNet downsampling block + "DownBlock2D", + "AttnDownBlock2D", # a ResNet downsampling block with spatial self-attention + "AttnDownBlock2D", + ), + up_block_types=( + "AttnUpBlock2D", + "AttnUpBlock2D", # a ResNet upsampling block with spatial self-attention + "UpBlock2D", + "UpBlock2D", # a regular ResNet upsampling block + ), +) +model.to(device); +``` + +当在处理更高分辨率的输入时,你可能想用更多层的下、上采样模块,让注意力层只聚焦在最低分辨率(最底)层来减少内存消耗。我们在之后会讨论该如何实验来找到最适用与你手头场景的配置方法。 + +我们可以通过输入一批数据和随机的迭代周期数来看输出是否与输入尺寸相同: + + +```python +with torch.no_grad(): + model_prediction = model(noisy_xb, timesteps).sample +model_prediction.shape +``` + + + + + torch.Size ([8, 3, 32, 32]) + + + +在下一步中,我们来看如何训练这个模型。 + +## 步骤 5:创建训练循环 + +终于可以训练了!下面这是 PyTorch 中经典的优化迭代循环,在这里一批一批的送入数据然后通过优化器来一步步更新模型参数 - 在这个样例中我们使用学习率为 0.0004 的 AdamW 优化器。 + +对于每一批的数据,我们要 +- 随机取样几个迭代周期 +- 根据预设为数据加入噪声 +- 把带噪数据送入模型 +- 使用 MSE 作为损失函数来比较目标结果与模型预测结果(在这里是加入噪声的场景) +- 通过`loss.backward ()`与`optimizer.step ()`来更新模型参数 + +在这个过程中我们记录 Loss 值用来后续的绘图。 + +NB: 这段代码大概需 10 分钟来运行 - 你也可以跳过以下两块操作直接使用预训练好的模型。供你选择,你可以探索下通过缩小模型层中的通道数会对运行速度有多少提升。 + +官方扩散模型示例 [official diffusers training example](https://colab.research.google.com/github/huggingface/notebooks/blob/main/diffusers/training_example.ipynb) 训练了在更高分辨率数据集上的一个更大的模型,这也是一个极为精简训练循环的优秀示例: + + +```python +# Set the noise scheduler +noise_scheduler = DDPMScheduler( + num_train_timesteps=1000, beta_schedule="squaredcos_cap_v2" +) + +# Training loop +optimizer = torch.optim.AdamW(model.parameters(), lr=4e-4) + +losses = [] + +for epoch in range(30): + for step, batch in enumerate(train_dataloader): + clean_images = batch["images"].to(device) + # Sample noise to add to the images + noise = torch.randn(clean_images.shape).to(clean_images.device) + bs = clean_images.shape[0] + + # Sample a random timestep for each image + timesteps = torch.randint( + 0, noise_scheduler.num_train_timesteps, (bs,), device=clean_images.device + ).long() + + # Add noise to the clean images according to the noise magnitude at each timestep + noisy_images = noise_scheduler.add_noise(clean_images, noise, timesteps) + + # Get the model prediction + noise_pred = model(noisy_images, timesteps, return_dict=False)[0] + + # Calculate the loss + loss = F.mse_loss(noise_pred, noise) + loss.backward(loss) + losses.append(loss.item()) + + # Update the model parameters with the optimizer + optimizer.step() + optimizer.zero_grad() + + if (epoch + 1) % 5 == 0: + loss_last_epoch = sum(losses[-len(train_dataloader) :]) / len(train_dataloader) + print(f"Epoch:{epoch+1}, loss: {loss_last_epoch}") +``` + + Epoch:5, loss: 0.16273280512541533 + Epoch:10, loss: 0.11161588924005628 + Epoch:15, loss: 0.10206522420048714 + Epoch:20, loss: 0.08302505919709802 + Epoch:25, loss: 0.07805309211835265 + Epoch:30, loss: 0.07474562455900013 + + +绘制 loss 曲线,我们能看到模型在一开始快速的收敛,接下来以一个较慢的速度持续优化(我们用右边 log 坐标轴的视图可以看的更清楚): + + +```python +fig, axs = plt.subplots(1, 2, figsize=(12, 4)) +axs[0].plot(losses) +axs[1].plot(np.log(losses)) +plt.show() +``` + + + + + [] + + + + + +![png](01_introduction_to_diffusers_CN_files/01_introduction_to_diffusers_CN_54_1.png) + + + +你可以选择运行上面的代码,也可以这样通过管道来调用模型: + + +```python +# Uncomment to instead load the model I trained earlier: +# model = butterfly_pipeline.unet +``` + +## 步骤 6:生成图像 + +我们怎么从这个模型中得到图像呢? + +### 方法 1:建立一个管道: + + +```python +from diffusers import DDPMPipeline + +image_pipe = DDPMPipeline(unet=model, scheduler=noise_scheduler) +``` + + +```python +pipeline_output = image_pipe() +pipeline_output.images[0] +``` + + + 0%| | 0/1000 [00:00 more corruption +noised_x = corrupt(x, amount) + +# Plottinf the noised version +axs[1].set_title('Corrupted data (-- amount increases -->)') +axs[1].imshow(torchvision.utils.make_grid(noised_x)[0], cmap='Greys'); +``` + +当噪声量接近1时,我们的数据开始看起来像纯随机噪声。但对于大多数的噪声情况下,您还是可以很好地识别出数字。你认为这是最佳的吗? + +## 模型 + +我们想要一个模型,它可以接收28px的噪声图像,并输出相同形状的预测。一个比较流行的选择是一个叫做UNet的架构。[最初被发明用于医学图像中的分割任务](https://arxiv.org/abs/1505.04597),UNet由一个“压缩路径”和一个“扩展路径”组成。“压缩路径”会使通过该路径的数据被压缩,而通过“扩展路径”会将数据扩展回原始维度(类似于自动编码器)。模型中的残差连接也允许信息和梯度在不同层级之间流动。 + +一些UNet的设计在每个阶段都有复杂的blocks,但对于这个玩具demo,我们只会构建一个最简单的示例,它接收一个单通道图像,并通过下行路径上的三个卷积层(图和代码中的down_layers)和上行路径上的3个卷积层,在下行和上行层之间具有残差连接。我们将使用max pooling进行下采样和`nn.Upsample`用于上采样。某些比较复杂的UNets的设计会使用带有可学习参数的上采样和下采样layer。下面的结构图大致展示了每个layer的输出通道数: + +![unet_diag.png](data:image/png;base64,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) + +代码实现如下: + + +```python +class BasicUNet(nn.Module): + """A minimal UNet implementation.""" + def __init__(self, in_channels=1, out_channels=1): + super().__init__() + self.down_layers = torch.nn.ModuleList([ + nn.Conv2d(in_channels, 32, kernel_size=5, padding=2), + nn.Conv2d(32, 64, kernel_size=5, padding=2), + nn.Conv2d(64, 64, kernel_size=5, padding=2), + ]) + self.up_layers = torch.nn.ModuleList([ + nn.Conv2d(64, 64, kernel_size=5, padding=2), + nn.Conv2d(64, 32, kernel_size=5, padding=2), + nn.Conv2d(32, out_channels, kernel_size=5, padding=2), + ]) + self.act = nn.SiLU() # The activation function + self.downscale = nn.MaxPool2d(2) + self.upscale = nn.Upsample(scale_factor=2) + + def forward(self, x): + h = [] + for i, l in enumerate(self.down_layers): + x = self.act(l(x)) # Through the layer and the activation function + if i < 2: # For all but the third (final) down layer: + h.append(x) # Storing output for skip connection + x = self.downscale(x) # Downscale ready for the next layer + + for i, l in enumerate(self.up_layers): + if i > 0: # For all except the first up layer + x = self.upscale(x) # Upscale + x += h.pop() # Fetching stored output (skip connection) + x = self.act(l(x)) # Through the layer and the activation function + + return x +``` + +我们可以验证输出shape是否如我们期望的那样与输入相同: + + +```python +net = BasicUNet() +x = torch.rand(8, 1, 28, 28) +net(x).shape +``` + + + + + torch.Size([8, 1, 28, 28]) + + + +该网络有30多万个参数: + + +```python +sum([p.numel() for p in net.parameters()]) +``` + + + + + 309057 + + + +您可以尝试更改每个layer中的通道数或尝试不同的结构设计。 + +## 训练模型 + +那么,模型到底应该做什么呢?同样,对这个问题有各种不同的看法,但对于这个演示,让我们选择一个简单的框架:给定一个损坏的输入noisy_x,模型应该输出它对原本x的最佳猜测。我们将通过均方误差将预测与真实值进行比较。 + +我们现在可以尝试训练网络了。 +- 获取一批数据 +- 添加随机噪声 +- 将数据输入模型 +- 将模型预测与干净图像进行比较,以计算loss +- 更新模型的参数。 + +你可以自由进行修改来尝试获得更好的结果! + + +```python +# Dataloader (you can mess with batch size) +batch_size = 128 +train_dataloader = DataLoader(dataset, batch_size=batch_size, shuffle=True) + +# How many runs through the data should we do? +n_epochs = 3 + +# Create the network +net = BasicUNet() +net.to(device) + +# Our loss finction +loss_fn = nn.MSELoss() + +# The optimizer +opt = torch.optim.Adam(net.parameters(), lr=1e-3) + +# Keeping a record of the losses for later viewing +losses = [] + +# The training loop +for epoch in range(n_epochs): + + for x, y in train_dataloader: + + # Get some data and prepare the corrupted version + x = x.to(device) # Data on the GPU + noise_amount = torch.rand(x.shape[0]).to(device) # Pick random noise amounts + noisy_x = corrupt(x, noise_amount) # Create our noisy x + + # Get the model prediction + pred = net(noisy_x) + + # Calculate the loss + loss = loss_fn(pred, x) # How close is the output to the true 'clean' x? + + # Backprop and update the params: + opt.zero_grad() + loss.backward() + opt.step() + + # Store the loss for later + losses.append(loss.item()) + + # Print our the average of the loss values for this epoch: + avg_loss = sum(losses[-len(train_dataloader):])/len(train_dataloader) + print(f'Finished epoch {epoch}. Average loss for this epoch: {avg_loss:05f}') + +# View the loss curve +plt.plot(losses) +plt.ylim(0, 0.1); +``` + + Finished epoch 0. Average loss for this epoch: 0.026736 + Finished epoch 1. Average loss for this epoch: 0.020692 + Finished epoch 2. Average loss for this epoch: 0.018887 + + + + +![png](02_diffusion_models_from_scratch_CN_files/02_diffusion_models_from_scratch_CN_24_1.png) + + + +我们可以尝试通过抓取一批数据,以不同的数量损坏数据,然后喂进模型获得预测来观察结果: + + +```python +#@markdown Visualizing model predictions on noisy inputs: + +# Fetch some data +x, y = next(iter(train_dataloader)) +x = x[:8] # Only using the first 8 for easy plotting + +# Corrupt with a range of amounts +amount = torch.linspace(0, 1, x.shape[0]) # Left to right -> more corruption +noised_x = corrupt(x, amount) + +# Get the model predictions +with torch.no_grad(): + preds = net(noised_x.to(device)).detach().cpu() + +# Plot +fig, axs = plt.subplots(3, 1, figsize=(12, 7)) +axs[0].set_title('Input data') +axs[0].imshow(torchvision.utils.make_grid(x)[0].clip(0, 1), cmap='Greys') +axs[1].set_title('Corrupted data') +axs[1].imshow(torchvision.utils.make_grid(noised_x)[0].clip(0, 1), cmap='Greys') +axs[2].set_title('Network Predictions') +axs[2].imshow(torchvision.utils.make_grid(preds)[0].clip(0, 1), cmap='Greys'); +``` + + + +![png](02_diffusion_models_from_scratch_CN_files/02_diffusion_models_from_scratch_CN_26_0.png) + + + +你可以看到,对于较低的噪声水平数量,预测的结果相当不错!但是,当噪声水平非常高时,模型能够获得的信息就开始逐渐减少。而当我们达到amount = 1时,模型会输出一个模糊的预测,该预测会很接近数据集的平均值。模型通过这样的方式来猜测原始输入。 + +## 取样(采样) + +如果我们在高噪声水平下的预测不是很好,我们如何才能生成图像呢? + +如果我们从完全随机的噪声开始,检查一下模型预测的结果,然后只朝着预测方向移动一小部分,比如说20%。现在我们有一个噪声很多的图像,其中可能隐藏了一些关于输入数据的结构的提示,我们可以将其输入到模型中以获得新的预测。希望这个新的预测比第一个稍微好一点(因为我们这一次的输入稍微减少了一点噪声),所以我们可以用这个新的更好的预测再往前迈出一小步。 + +如果一切顺利的话,以上过程重复几次以后我们就会得到一个新的图像!以下图例是迭代了五次以后的结果,左侧是每个阶段的模型输入的可视化,右侧则是预测的去噪图像。Note that even though the model predicts the denoised image even at step 1, we only move x part of the way there. 重复几次以后,图像的结构开始逐渐出现并得到改善,直到获得我们的最终结果为止。 + + +```python +#@markdown Sampling strategy: Break the process into 5 steps and move 1/5'th of the way there each time: +n_steps = 5 +x = torch.rand(8, 1, 28, 28).to(device) # Start from random +step_history = [x.detach().cpu()] +pred_output_history = [] + +for i in range(n_steps): + with torch.no_grad(): # No need to track gradients during inference + pred = net(x) # Predict the denoised x0 + pred_output_history.append(pred.detach().cpu()) # Store model output for plotting + mix_factor = 1/(n_steps - i) # How much we move towards the prediction + x = x*(1-mix_factor) + pred*mix_factor # Move part of the way there + step_history.append(x.detach().cpu()) # Store step for plotting + +fig, axs = plt.subplots(n_steps, 2, figsize=(9, 4), sharex=True) +axs[0,0].set_title('x (model input)') +axs[0,1].set_title('model prediction') +for i in range(n_steps): + axs[i, 0].imshow(torchvision.utils.make_grid(step_history[i])[0].clip(0, 1), cmap='Greys') + axs[i, 1].imshow(torchvision.utils.make_grid(pred_output_history[i])[0].clip(0, 1), cmap='Greys') +``` + + + +![png](02_diffusion_models_from_scratch_CN_files/02_diffusion_models_from_scratch_CN_29_0.png) + + + +我们可以将流程分成更多步骤,并希望通过这种方式获得更好的图像: + + +```python +#@markdown Showing more results, using 40 sampling steps +n_steps = 40 +x = torch.rand(64, 1, 28, 28).to(device) +for i in range(n_steps): + noise_amount = torch.ones((x.shape[0], )).to(device) * (1-(i/n_steps)) # Starting high going low + with torch.no_grad(): + pred = net(x) + mix_factor = 1/(n_steps - i) + x = x*(1-mix_factor) + pred*mix_factor +fig, ax = plt.subplots(1, 1, figsize=(12, 12)) +ax.imshow(torchvision.utils.make_grid(x.detach().cpu(), nrow=8)[0].clip(0, 1), cmap='Greys') +``` + + + + + + + + + + +![png](02_diffusion_models_from_scratch_CN_files/02_diffusion_models_from_scratch_CN_31_1.png) + + + +结果并不是非常好,但是已经出现了一些可以被认出来的数字!您可以尝试训练更长时间(例如,10或20个epoch),并调整模型配置、学习率、优化器等。此外,如果您想尝试稍微困难一点的数据集,您可以尝试一下fashionMNIST,只需要一行代码的替换就可以了。 + +## 与 DDPM 做比较 + +在本节中,我们将看看我们的“玩具”实现与其他笔记本中使用的基于DDPM论文的方法有何不同([扩散器简介](https://github.com/huggingface/diffusion-models-class/blob/main/unit1/01_introduction_to_diffusers.ipynb))。 + +我们将会看到的 + +* 模型的表现受限于随迭代周期(timesteps)变化的控制条件,在前向传到中时间步(t)是作为一个参数被传入的 +* 有很多不同的取样策略可选择,可能会比我们上面所使用的最简单的版本更好 +* diffusers`UNet2DModel`比我们的BasicUNet更先进 +* 损坏过程的处理方式不同 +* 训练目标不同,包括预测噪声而不是去噪图像 +* 该模型通过调节timestep来调节噪声水平, 其中t作为一个附加参数传入前向过程中。 +* 有许多不同的采样策略可供选择,它们应该比我们上面简单的版本更有效。 + +自DDPM论文发表以来,已经有人提出了许多改进建议,但这个例子对于不同的可用设计决策具有指导意义。读完这篇文章后,你可能会想要深入了解这篇论文['Elucidating the Design Space of Diffusion-Based Generative Models'](https://arxiv.org/abs/2206.00364)它对所有这些组件进行了详细的探讨,并就如何获得最佳性能提出了新的建议。 + +如果你觉得这些内容对你来说太过深奥了,请不要担心!你可以随意跳过本笔记本的其余部分或将其保存以备不时之需。 + +### UNet + +diffusers中的UNet2DModel模型比上述基本UNet模型有许多改进: + +* GroupNorm层对每个blocks的输入进行了组标准化(group normalization) +* Dropout层能使训练更平滑 +* 每个块有多个resnet层(如果layers_per_block未设置为1) +* 注意机制(通常仅用于输入分辨率较低的blocks) +* timestep的调节。 +* 具有可学习参数的下采样和上采样块 + +让我们来创建并仔细研究一下UNet2DModel: + + +```python +model = UNet2DModel( + sample_size=28, # the target image resolution + in_channels=1, # the number of input channels, 3 for RGB images + out_channels=1, # the number of output channels + layers_per_block=2, # how many ResNet layers to use per UNet block + block_out_channels=(32, 64, 64), # Roughly matching our basic unet example + down_block_types=( + "DownBlock2D", # a regular ResNet downsampling block + "AttnDownBlock2D", # a ResNet downsampling block with spatial self-attention + "AttnDownBlock2D", + ), + up_block_types=( + "AttnUpBlock2D", + "AttnUpBlock2D", # a ResNet upsampling block with spatial self-attention + "UpBlock2D", # a regular ResNet upsampling block + ), +) +print(model) +``` + + UNet2DModel( + (conv_in): Conv2d(1, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_proj): Timesteps() + (time_embedding): TimestepEmbedding( + (linear_1): Linear(in_features=32, out_features=128, bias=True) + (act): SiLU() + (linear_2): Linear(in_features=128, out_features=128, bias=True) + ) + (down_blocks): ModuleList( + (0): DownBlock2D( + (resnets): ModuleList( + (0): ResnetBlock2D( + (norm1): GroupNorm(32, 32, eps=1e-05, affine=True) + (conv1): Conv2d(32, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=32, bias=True) + (norm2): GroupNorm(32, 32, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(32, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + ) + (1): ResnetBlock2D( + (norm1): GroupNorm(32, 32, eps=1e-05, affine=True) + (conv1): Conv2d(32, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=32, bias=True) + (norm2): GroupNorm(32, 32, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(32, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + ) + ) + (downsamplers): ModuleList( + (0): Downsample2D( + (conv): Conv2d(32, 32, kernel_size=(3, 3), stride=(2, 2), padding=(1, 1)) + ) + ) + ) + (1): AttnDownBlock2D( + (attentions): ModuleList( + (0): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + (1): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + ) + (resnets): ModuleList( + (0): ResnetBlock2D( + (norm1): GroupNorm(32, 32, eps=1e-05, affine=True) + (conv1): Conv2d(32, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(32, 64, kernel_size=(1, 1), stride=(1, 1)) + ) + (1): ResnetBlock2D( + (norm1): GroupNorm(32, 64, eps=1e-05, affine=True) + (conv1): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + ) + ) + (downsamplers): ModuleList( + (0): Downsample2D( + (conv): Conv2d(64, 64, kernel_size=(3, 3), stride=(2, 2), padding=(1, 1)) + ) + ) + ) + (2): AttnDownBlock2D( + (attentions): ModuleList( + (0): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + (1): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + ) + (resnets): ModuleList( + (0): ResnetBlock2D( + (norm1): GroupNorm(32, 64, eps=1e-05, affine=True) + (conv1): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + ) + (1): ResnetBlock2D( + (norm1): GroupNorm(32, 64, eps=1e-05, affine=True) + (conv1): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + ) + ) + ) + ) + (up_blocks): ModuleList( + (0): AttnUpBlock2D( + (attentions): ModuleList( + (0): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + (1): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + (2): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + ) + (resnets): ModuleList( + (0): ResnetBlock2D( + (norm1): GroupNorm(32, 128, eps=1e-05, affine=True) + (conv1): Conv2d(128, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(128, 64, kernel_size=(1, 1), stride=(1, 1)) + ) + (1): ResnetBlock2D( + (norm1): GroupNorm(32, 128, eps=1e-05, affine=True) + (conv1): Conv2d(128, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(128, 64, kernel_size=(1, 1), stride=(1, 1)) + ) + (2): ResnetBlock2D( + (norm1): GroupNorm(32, 128, eps=1e-05, affine=True) + (conv1): Conv2d(128, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(128, 64, kernel_size=(1, 1), stride=(1, 1)) + ) + ) + (upsamplers): ModuleList( + (0): Upsample2D( + (conv): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + ) + ) + ) + (1): AttnUpBlock2D( + (attentions): ModuleList( + (0): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + (1): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + (2): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + ) + (resnets): ModuleList( + (0): ResnetBlock2D( + (norm1): GroupNorm(32, 128, eps=1e-05, affine=True) + (conv1): Conv2d(128, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(128, 64, kernel_size=(1, 1), stride=(1, 1)) + ) + (1): ResnetBlock2D( + (norm1): GroupNorm(32, 128, eps=1e-05, affine=True) + (conv1): Conv2d(128, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(128, 64, kernel_size=(1, 1), stride=(1, 1)) + ) + (2): ResnetBlock2D( + (norm1): GroupNorm(32, 96, eps=1e-05, affine=True) + (conv1): Conv2d(96, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(96, 64, kernel_size=(1, 1), stride=(1, 1)) + ) + ) + (upsamplers): ModuleList( + (0): Upsample2D( + (conv): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + ) + ) + ) + (2): UpBlock2D( + (resnets): ModuleList( + (0): ResnetBlock2D( + (norm1): GroupNorm(32, 96, eps=1e-05, affine=True) + (conv1): Conv2d(96, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=32, bias=True) + (norm2): GroupNorm(32, 32, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(32, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(96, 32, kernel_size=(1, 1), stride=(1, 1)) + ) + (1): ResnetBlock2D( + (norm1): GroupNorm(32, 64, eps=1e-05, affine=True) + (conv1): Conv2d(64, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=32, bias=True) + (norm2): GroupNorm(32, 32, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(32, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(64, 32, kernel_size=(1, 1), stride=(1, 1)) + ) + (2): ResnetBlock2D( + (norm1): GroupNorm(32, 64, eps=1e-05, affine=True) + (conv1): Conv2d(64, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=32, bias=True) + (norm2): GroupNorm(32, 32, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(32, 32, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + (conv_shortcut): Conv2d(64, 32, kernel_size=(1, 1), stride=(1, 1)) + ) + ) + ) + ) + (mid_block): UNetMidBlock2D( + (attentions): ModuleList( + (0): AttentionBlock( + (group_norm): GroupNorm(32, 64, eps=1e-05, affine=True) + (query): Linear(in_features=64, out_features=64, bias=True) + (key): Linear(in_features=64, out_features=64, bias=True) + (value): Linear(in_features=64, out_features=64, bias=True) + (proj_attn): Linear(in_features=64, out_features=64, bias=True) + ) + ) + (resnets): ModuleList( + (0): ResnetBlock2D( + (norm1): GroupNorm(32, 64, eps=1e-05, affine=True) + (conv1): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + ) + (1): ResnetBlock2D( + (norm1): GroupNorm(32, 64, eps=1e-05, affine=True) + (conv1): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (time_emb_proj): Linear(in_features=128, out_features=64, bias=True) + (norm2): GroupNorm(32, 64, eps=1e-05, affine=True) + (dropout): Dropout(p=0.0, inplace=False) + (conv2): Conv2d(64, 64, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + (nonlinearity): SiLU() + ) + ) + ) + (conv_norm_out): GroupNorm(32, 32, eps=1e-05, affine=True) + (conv_act): SiLU() + (conv_out): Conv2d(32, 1, kernel_size=(3, 3), stride=(1, 1), padding=(1, 1)) + ) + + +正如你所看到的,还有更多!它比我们的BasicUNet有多得多的参数量: + + +```python +sum([p.numel() for p in model.parameters()]) # 1.7M vs the ~309k parameters of the BasicUNet +``` + + + + + 1707009 + + + +我们可以用这个模型代替原来的模型来重复一遍上面展示的训练过程。我们需要将x和timestep传递给模型(这里我会传递t = 0,以表明它在没有timestep条件的情况下工作,并保持采样代码简单,但您也可以尝试输入 `(amount*1000)`,使timestep与噪声水平相当)。如果要检查代码,更改的行将显示为“`#<<<`。 + + +```python +#@markdown Trying UNet2DModel instead of BasicUNet: + +# Dataloader (you can mess with batch size) +batch_size = 128 +train_dataloader = DataLoader(dataset, batch_size=batch_size, shuffle=True) + +# How many runs through the data should we do? +n_epochs = 3 + +# Create the network +net = UNet2DModel( + sample_size=28, # the target image resolution + in_channels=1, # the number of input channels, 3 for RGB images + out_channels=1, # the number of output channels + layers_per_block=2, # how many ResNet layers to use per UNet block + block_out_channels=(32, 64, 64), # Roughly matching our basic unet example + down_block_types=( + "DownBlock2D", # a regular ResNet downsampling block + "AttnDownBlock2D", # a ResNet downsampling block with spatial self-attention + "AttnDownBlock2D", + ), + up_block_types=( + "AttnUpBlock2D", + "AttnUpBlock2D", # a ResNet upsampling block with spatial self-attention + "UpBlock2D", # a regular ResNet upsampling block + ), +) #<<< +net.to(device) + +# Our loss finction +loss_fn = nn.MSELoss() + +# The optimizer +opt = torch.optim.Adam(net.parameters(), lr=1e-3) + +# Keeping a record of the losses for later viewing +losses = [] + +# The training loop +for epoch in range(n_epochs): + + for x, y in train_dataloader: + + # Get some data and prepare the corrupted version + x = x.to(device) # Data on the GPU + noise_amount = torch.rand(x.shape[0]).to(device) # Pick random noise amounts + noisy_x = corrupt(x, noise_amount) # Create our noisy x + + # Get the model prediction + pred = net(noisy_x, 0).sample #<<< Using timestep 0 always, adding .sample + + # Calculate the loss + loss = loss_fn(pred, x) # How close is the output to the true 'clean' x? + + # Backprop and update the params: + opt.zero_grad() + loss.backward() + opt.step() + + # Store the loss for later + losses.append(loss.item()) + + # Print our the average of the loss values for this epoch: + avg_loss = sum(losses[-len(train_dataloader):])/len(train_dataloader) + print(f'Finished epoch {epoch}. Average loss for this epoch: {avg_loss:05f}') + +# Plot losses and some samples +fig, axs = plt.subplots(1, 2, figsize=(12, 5)) + +# Losses +axs[0].plot(losses) +axs[0].set_ylim(0, 0.1) +axs[0].set_title('Loss over time') + +# Samples +n_steps = 40 +x = torch.rand(64, 1, 28, 28).to(device) +for i in range(n_steps): + noise_amount = torch.ones((x.shape[0], )).to(device) * (1-(i/n_steps)) # Starting high going low + with torch.no_grad(): + pred = net(x, 0).sample + mix_factor = 1/(n_steps - i) + x = x*(1-mix_factor) + pred*mix_factor + +axs[1].imshow(torchvision.utils.make_grid(x.detach().cpu(), nrow=8)[0].clip(0, 1), cmap='Greys') +axs[1].set_title('Generated Samples'); +``` + + Finished epoch 0. Average loss for this epoch: 0.018925 + Finished epoch 1. Average loss for this epoch: 0.012785 + Finished epoch 2. Average loss for this epoch: 0.011694 + + + + +![png](02_diffusion_models_from_scratch_CN_files/02_diffusion_models_from_scratch_CN_39_1.png) + + + +这看起来比我们的第一组结果好多了!您可以尝试调整UNet配置或更长时间的训练,以获得更好的性能。 + +### 损坏过程 + +DDPM论文描述了一个为每个“timestep”添加少量噪声的损坏过程。 为某些timestep给定 $x_{t-1}$ ,我们可以得到一个噪声稍稍增加的 $x_t$:

+ +$q(\mathbf{x}_t \vert \mathbf{x}_{t-1}) = \mathcal{N}(\mathbf{x}_t; \sqrt{1 - \beta_t} \mathbf{x}_{t-1}, \beta_t\mathbf{I}) \quad +q(\mathbf{x}_{1:T} \vert \mathbf{x}_0) = \prod^T_{t=1} q(\mathbf{x}_t \vert \mathbf{x}_{t-1})$

+ + +这就是说,我们取 $x_{t-1}$, 给他一个$\sqrt{1 - \beta_t}$ 的系数,然后加上带有 $\beta_t$系数的噪声。 这里 $\beta$ 是根据一些管理器来为每一个t设定的,来决定每一个迭代周期中添加多少噪声。 现在,我们不想把这个推演进行500次来得到 $x_{500}$,所以我们用另一个公式来根据给出的 $x_0$ 计算得到任意t时刻的 $x_t$:

+ +$\begin{aligned} +q(\mathbf{x}_t \vert \mathbf{x}_0) &= \mathcal{N}(\mathbf{x}_t; \sqrt{\bar{\alpha}_t} \mathbf{x}_0, \sqrt{(1 - \bar{\alpha}_t)} \mathbf{I}) +\end{aligned}$ where $\bar{\alpha}_t = \prod_{i=1}^T \alpha_i$ and $\alpha_i = 1-\beta_i$

+ +数学符号看起来总是很吓人!幸运的是,调度器为我们处理了所有这些(取消下一个单元格的注释以检查代码)。我们可以画出 $\sqrt{\bar{\alpha}_t}$ (标记为 `sqrt_alpha_prod`) 和 $\sqrt{(1 - \bar{\alpha}_t)}$ (标记为 `sqrt_one_minus_alpha_prod`) 来看一下输入(x)与噪声是如何在不同迭代周期中量化和叠加的: + + + +```python +#??noise_scheduler.add_noise +``` + + +```python +noise_scheduler = DDPMScheduler(num_train_timesteps=1000) +plt.plot(noise_scheduler.alphas_cumprod.cpu() ** 0.5, label=r"${\sqrt{\bar{\alpha}_t}}$") +plt.plot((1 - noise_scheduler.alphas_cumprod.cpu()) ** 0.5, label=r"$\sqrt{(1 - \bar{\alpha}_t)}$") +plt.legend(fontsize="x-large"); +``` + + + +![png](02_diffusion_models_from_scratch_CN_files/02_diffusion_models_from_scratch_CN_43_0.png) + + + +一开始, 噪声x里绝大部分都是x自身的值 (sqrt_alpha_prod ~= 1),但是随着时间的推移,x的成分逐渐降低而噪声的成分逐渐增加。与我们根据`amount`对x和噪声进行线性混合不同,这个噪声的增加相对较快。我们可以在一些数据上看到这一点: + + +```python +#@markdown visualize the DDPM noising process for different timesteps: + +# Noise a batch of images to view the effect +fig, axs = plt.subplots(3, 1, figsize=(16, 10)) +xb, yb = next(iter(train_dataloader)) +xb = xb.to(device)[:8] +xb = xb * 2. - 1. # Map to (-1, 1) +print('X shape', xb.shape) + +# Show clean inputs +axs[0].imshow(torchvision.utils.make_grid(xb[:8])[0].detach().cpu(), cmap='Greys') +axs[0].set_title('Clean X') + +# Add noise with scheduler +timesteps = torch.linspace(0, 999, 8).long().to(device) +noise = torch.randn_like(xb) # << NB: randn not rand +noisy_xb = noise_scheduler.add_noise(xb, noise, timesteps) +print('Noisy X shape', noisy_xb.shape) + +# Show noisy version (with and without clipping) +axs[1].imshow(torchvision.utils.make_grid(noisy_xb[:8])[0].detach().cpu().clip(-1, 1), cmap='Greys') +axs[1].set_title('Noisy X (clipped to (-1, 1)') +axs[2].imshow(torchvision.utils.make_grid(noisy_xb[:8])[0].detach().cpu(), cmap='Greys') +axs[2].set_title('Noisy X'); +``` + + X shape torch.Size([8, 1, 28, 28]) + Noisy X shape torch.Size([8, 1, 28, 28]) + + + + +![png](02_diffusion_models_from_scratch_CN_files/02_diffusion_models_from_scratch_CN_45_1.png) + + + +在运行中的另一个变化:在DDPM版本中,加入的噪声是取自一个高斯分布(来自均值0方差1的torch.randn),而不是在我们原始 `corrupt`函数中使用的 0-1之间的均匀分布(torch.rand),当然对训练数据做正则化也可以理解。在另一篇笔记中,你会看到 `Normalize(0.5, 0.5)`函数在变化列表中,它把图片数据从(0, 1) 区间映射到 (-1, 1),对我们的目标来说也‘足够用了’。我们在此篇笔记中没使用这个方法,但在上面的可视化中为了更好的展示添加了这种做法。 + + +```python + +``` + +### 训练目标 + +在我们的玩具示例中,我们让模型尝试预测去噪图像。在DDPM和许多其他扩散模型实现中,模型则会预测损坏过程中使用的噪声(在缩放之前,因此是单位方差噪声)。在代码中,它看起来像使这样: + +```python +noise = torch.randn_like(xb) # << NB: randn not rand +noisy_x = noise_scheduler.add_noise(x, noise, timesteps) +model_prediction = model(noisy_x, timesteps).sample +loss = mse_loss(model_prediction, noise) # noise as the target +``` + +你可能认为预测噪声(我们可以从中得出去噪图像的样子)等同于直接预测去噪图像。那么,为什么要这么做呢?这仅仅是为了数学上的方便吗? + +这里其实还有另一些精妙之处。我们在训练过程中,会计算不同(随机选择)timestep的loss。这些不同的目标将导致这些loss的不同的“隐含权重”,其中预测噪声会将更多的权重放在较低的噪声水平上。你可以选择更复杂的目标来改变这种“隐性损失权重”。或者,您选择的噪声管理器将在较高的噪声水平下产生更多的示例。也许你让模型设计成预测“velocity”v,我们将其定义为由噪声水平影响的图像和噪声组合(请参阅“扩散模型快速采样的渐进蒸馏”- 'PROGRESSIVE DISTILLATION FOR FAST SAMPLING OF DIFFUSION MODELS')。也许你将模型设计成预测噪声,然后基于某些因子来对loss进行缩放:比如有些理论指出可以参考噪声水平(参见“扩散模型的感知优先训练”-'Perception Prioritized Training of Diffusion Models'),或者基于一些探索模型最佳噪声水平的实验(参见“基于扩散的生成模型的设计空间说明”-'Elucidating the Design Space of Diffusion-Based Generative Models')。 + +一句话解释:选择目标对模型性能有影响,现在有许多研究者正在探索“最佳”选项是什么。 +目前,预测噪声(epsilon或eps)是最流行的方法,但随着时间的推移,我们很可能会看到库中支持的其他目标,并在不同的情况下使用。 + +### 迭代周期(Timestep)调节 + +UNet2DModel以x和timestep为输入。后者被转化为一个嵌入(embedding),并在多个地方被输入到模型中。 + +这背后的理论支持是这样的:通过向模型提供有关噪声水平的信息,它可以更好地执行任务。虽然在没有这种timestep条件的情况下也可以训练模型,但在某些情况下,它似乎确实有助于性能,目前来说绝大多数的模型实现都包括了这一输入。 + +### 取样(采样) + +有一个模型可以用来预测在带噪样本中的噪声(或者说能预测其去噪版本),我们怎么用它来生成图像呢? + +我们可以给入纯噪声,然后就希望模型能一步就输出一个不带噪声的好图像。但是,就我们上面所见到的来看,这通常行不通。所以,我们在模型预测的基础上使用足够多的小步,迭代着来每次去除一点点噪声。 + +具体我们怎么走这些小步,取决于使用上面取样方法。我们不会去深入讨论太多的理论细节,但是一些顶层想法是这样: +- 每一步你想走多大?也就是说,你遵循什么样的“噪声计划(噪声管理)”? +- 你只使用模型当前步的预测结果来指导下一步的更新方向吗(像DDPM,DDIM或是其他的什么那样)?你是否要使用模型来多预测几次来估计一个更高阶的梯度来更新一步更大更准确的结果(更高阶的方法和一些离散ODE处理器)?或者保留历史预测值来尝试更好的指导当前步的更新(线性多步或遗传取样器)? +- 你是否会在取样过程中额外再加一些随机噪声,或你完全已知得(deterministic)来添加噪声?许多取样器通过参数(如DDIM中的'eta')来供用户选择。 + +对于扩散模型取样器的研究演进的很快,随之开发出了越来越多可以使用更少步就找到好结果的方法。勇敢和有好奇心的人可能会在浏览diffusers library中不同部署方法时感到非常有意思 [here](https://github.com/huggingface/diffusers/tree/main/src/diffusers/schedulers) 或看看 [docs](https://huggingface.co/docs/diffusers/api/schedulers) 这里经常有一些相关的paper. + +## 结语 + +希望这可以从一些不同的角度来审视扩散模型提供一些帮助。 +这篇笔记是Jonathan Whitaker为Hugging Face 课程所写的,同时也有 [version included in his own course](https://johnowhitaker.github.io/tglcourse/dm1.html),“风景的生成”- 'The Generative Landscape'。如果你对从噪声和约束分类来生成样本的例子感兴趣。问题与bug可以通过GitHub issues 或 Discord来交流。 也同时欢迎通过Twitter联系 [@johnowhitaker](https://twitter.com/johnowhitaker). diff --git 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0000000000000000000000000000000000000000..2f156d497386fa0d26503c9d9c2fbb06615aa74d --- /dev/null +++ b/markdown/unit1/02_diffusion_models_from_scratch_CN_files/02_diffusion_models_from_scratch_CN_45_1.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:1d18d95dcc9ab62110c54e50370bd72d7cde9c902fb40e690ab6ff0bef93c875 +size 53066 diff --git a/markdown/unit1/README_CN.md b/markdown/unit1/README_CN.md new file mode 100644 index 0000000000000000000000000000000000000000..90c5accfe8c4c2b5aa8d56e83af0b337641e7dd7 --- /dev/null +++ b/markdown/unit1/README_CN.md @@ -0,0 +1,65 @@ +# 单元 1: 扩散模型简介 + +欢迎来到 Hugging Face 扩散模型课程第一单元!在本单元中,你将学习到有关扩散模型如何运作的基础知识,同时也会学到如何使用 🤗 diffusers 库。 + +## 开始本单元 :rocket: + +以下是本单元的学习步骤: + +- 请确保你已经 [注册了该课程](https://huggingface.us17.list-manage.com/subscribe?u=7f57e683fa28b51bfc493d048&id=ef963b4162)。这样当有新课程材料发布的时候你就会收到通知 +- 通读下面的介绍材料以及任何你感兴趣的其他资源 +- 查看下面的 _**Introduction to Diffusers**_ Notebook 链接,以使用 `diffuers` 库将理论应用到实践中 +- 使用 Notebook 或链接的训练脚本来训练和分享你自己的扩散模型 +- (可选) 如果你有兴趣看到一个极简的从头开始的项目实现,并探索所涉及的不同设计决策,你可以深入研究 _**Diffusion Models from Scratch**_ 这个 Notebook + + +:loudspeaker: 请不要忘了加入我们的频道 [Discord](https://huggingface.co/join/discord), 你可以在 `#diffusion-models-class` 频道来讨论课程内容以及分享你的作品。 + +## 什么是扩散模型? + +扩散模型是「生成模型」算法家族的新成员通过学习给定的训练样本,生成模型可以学会如何 **生成** 数据,比如生成图片或者声音。一个好的生成模型能生成一组 **样式不同** 的输出。这些输出会与训练数据相似,但不是一模一样的副本。扩散模型如何实现这一点?为了便于说明,让我们先看看图像生成的案例。 + +

+ +
+ 图片来源于 DDPM paper (https://arxiv.org/abs/2006.11239)。 +

+ +扩散模型成功的秘诀在于扩散过程的迭代本质。最先生成的只是一组随机噪声,但是经过若干步的逐渐改善之后,最终会出现有意义的图像。在每一步中,模型都会估计如何从当前的输入生成完全去噪的结果。因为我们在每一步都只做了一个小小的变动,所以在早期阶段(预测最终输出实际上非常困难),这个估计中的任何 error 都可以在以后的更新中得到纠正。 + +与其他类型的生成模型相比,训练扩散模型相对较为容易。我们只需要重复以下步骤即可: + +1) 从训练数据中加载一些图像 +2) 添加不同级别的噪声。请记住,我们希望模型在面对添加了极端噪声和几乎没有添加噪声的带噪图像时,都能够很好地估计如何 “修复”(去噪)。 +3) 将带噪输入送入模型中 +4) 评估模型对这些输入进行去噪的效果 +5) 使用此信息更新模型权重 + +为了用训练好的模型生成新的图像,我们从完全随机的输入开始,反复将其输入模型,每次根据模型预测进行少量更新。我们之后会学到有许多采样方法试图简化这个过程,以便我们可以用尽可能少的步骤生成好的图像。 +我们将在第一单元的实践笔记本中详细介绍这些步骤。在第二单元中,我们将了解如何修改此过程,来通过额外的条件(例如类标签)或使用指导等技术来增加对模型输出的额外控制。第三单元和第四单元将探索一种非常强大的扩散模型,称为稳定扩散 (stable diffusion),它可以生成给定文本描述的图像。 + +## 实践笔记本 + +到这里,你已经足够了解如何开始使用附带的笔记本了!这里的两个笔记本以不同的方式表达了相同的想法。 + +| Chapter | Colab | Kaggle | Gradient | Studio Lab | +|:--------------------------------------------|:----------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:---------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:---------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:-------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------| +| Introduction to Diffusers | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/darcula1993/diffusion-models-class-CN/blob/main/unit1/01_introduction_to_diffusers_CN.ipynb) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/huggingface/diffusion-models-class/blob/main/unit1/01_introduction_to_diffusers_CN.ipynb) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/darcula1993/diffusion-models-class-CN/blob/main/unit1/01_introduction_to_diffusers_CN.ipynb) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/darcula1993/diffusion-models-class-CN/blob/main/unit1/01_introduction_to_diffusers_CN.ipynb) | +| Diffusion Models from Scratch | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/darcula1993/diffusion-models-class-CN/blob/main/unit1/02_diffusion_models_from_scratch_CN.ipynb) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/huggingface/diffusion-models-class/blob/main/unit1/02_diffusion_models_from_scratch_CN.ipynb) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/darcula1993/diffusion-models-class-CN/blob/main/unit1/02_diffusion_models_from_scratch_CN.ipynb) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/darcula1993/diffusion-models-class-CN/blob/main/unit1/02_diffusion_models_from_scratch_CN.ipynb) | + +在 _**Introduction to Diffusers**_ 这个 Notebook 中,我们使用 diffusers 库中的构造模块显示了与上述不同的步骤。你将很快看到如何根据你选择的任何数据创建、训练和采样你自己的扩散模型。 在笔记本结束时,你将能够阅读和修改示例训练脚本,以训练扩散模型,并将其与全世界共同分享! 本笔记本还介绍了与本单元相关的主要练习,在这里,我们将共同尝试为不同规模的扩散模型找出好的「训练脚本」- 请参阅下一节了解更多信息。 + +在 _**Diffusion Models from Scratch**_ 这个 Notebook 中,我们展示了相同的步骤(向数据添加噪声、创建模型、训练和采样),并尽可能简单地在 PyTorch 中从头开始实现。然后,我们将这个「玩具示例」与 `diffusers` 版本进行比较,并关注两者的区别以及改进之处。这里的目标是熟悉不同的组件和其中的设计决策,以便在查看新的实现时能够快速确定关键思想。 + +## 项目时间 + +现在,你已经掌握了基本知识,可以开始训练你自己的扩散模型了! _**Introduction to Diffusers**_ 这个 Notebook 的末尾有一些小提示,希望你能与社区分享你的成果、训练脚本和发现,以便我们能够一起找出训练这些模型的最佳方法。 + +## 一些额外的材料 + +- [《Hugging Face 博客: 带注释的扩散模型》](https://huggingface.co/blog/annotated-diffusion)是对 DDPM 背后的代码和理论的非常深入的介绍,其中包括数学和显示了所有不同的组件的代码。它还链接了一些论文供进一步阅读: +- [Hugging Face 文档: 无条件图像生成 (Unconditional Image-Generation)](https://huggingface.co/docs/diffusers/training/unconditional_training),包含了有关如何使用官方训练示例脚本训练扩散模型的一些示例,包括演示如何创建自己的数据集的代码: +- AI Coffee Break video on Diffusion Models: https://www.youtube.com/watch?v=344w5h24-h8 +- Yannic Kilcher Video on DDPMs: https://www.youtube.com/watch?v=W-O7AZNzbzQ + +发现了有其他任何有帮助的资源?请 [向我们提出](https://github.com/huggingface/diffusion-models-class/issues),我们会将其加入到上面的列表中。 \ No newline at end of file diff --git a/markdown/unit2/01_finetuning_and_guidance_CN.md b/markdown/unit2/01_finetuning_and_guidance_CN.md new file mode 100644 index 0000000000000000000000000000000000000000..800bd89d67ebb023dd1ca2d087efc6d8315fd105 --- /dev/null +++ b/markdown/unit2/01_finetuning_and_guidance_CN.md @@ -0,0 +1,1048 @@ +# Fine-Tuning and Guidance + +在这一节的笔记本中,我们将讲解两种主要的基于现有模型实现改造的方法: + +* 通过**微调(fine-tuning)**,我们将在新的数据集上重新训练已有的模型,来改变它原有的输出类型 +* 通过**引导(guidance)**,我们将在推理阶段引导现有模型的生成过程,以此来获取额外的控制 + +## 你将学到: + +在阅读完这一节笔记本后,你将学会: + +- 创建一个采样循环,并使用调度器(scheduler)更快地生成样本 +- 在新数据集上微调一个现有的扩散模型,这包括: + - 使用累积梯度的方法去应对训练的 batch 太小所带来的一些问题 + - 在训练过程中,将样本上传到 [Weights and Biases](https://wandb.ai/site) 来记录日志,以此来监控训练过程(通过附加的实例脚本程序) + - 将最终结果管线(pipeline)保存下来,并上传到Hub +- 通过新加的损失函数来引导采样过程,以此对现有模型施加控制,这包括: + - 通过一个简单的基于颜色的损失来探索不同的引导方法 + - 使用 CLIP,用文本来引导生成过程 + - 用 Gradio 和 🤗 Spaces 来分享你的定制的采样循环 + +❓如果你有问题,请在 Hugging Face Discord 的 `#diffusion-models-class` 频道提出。如果你还没有 Hugging Face 的账号,你可以在这里注册:https://huggingface.co/join/discord + +## 配置过程和需要引入的库 + +为了将你的微调过的模型保存到 Hugging Face Hub 上,你需要使用一个**具有写权限的访问令牌**来登录。下列代码将会引导你登陆并连接上你的账号的相关令牌页。如果在模型训练过程中,你想使用训练脚本将样本记录到日志,你也需要一个 Weights and Biases 账号 —— 同样地,这些代码也会在需要的时候引导你登录。 + +此外,你唯一需要配置的就是安装几个依赖,并在程序中引入我们需要的东西然后制定好我们将使用的计算设备。 + + + +```python +!pip install -qq diffusers datasets accelerate wandb open-clip-torch +``` + + +```python +# Code to log in to the Hugging Face Hub, needed for sharing models +# Make sure you use a token with WRITE access +from huggingface_hub import notebook_login + +notebook_login() +``` + + Token is valid. + Your token has been saved in your configured git credential helpers (store). + Your token has been saved to /root/.huggingface/token + Login successful + + + +```python +import numpy as np +import torch +import torch.nn.functional as F +import torchvision +from datasets import load_dataset +from diffusers import DDIMScheduler, DDPMPipeline +from matplotlib import pyplot as plt +from PIL import Image +from torchvision import transforms +from tqdm.auto import tqdm +``` + + +```python +device = ( + "mps" + if torch.backends.mps.is_available() + else "cuda" + if torch.cuda.is_available() + else "cpu" +) +``` + +## 载入一个预训练过的管线 + +在本节笔记本的开始,我们先载入一个现有的管线,来看看我们能用它做些什么: + + + +```python +image_pipe = DDPMPipeline.from_pretrained("google/ddpm-celebahq-256") +image_pipe.to(device); +``` + + + Fetching 4 files: 0%| | 0/4 [00:00] + + + + + +![png](01_finetuning_and_guidance_CN_files/01_finetuning_and_guidance_CN_28_5.png) + + + +**考虑因素2:** 我们的损失值曲线简直像噪声一样混乱!这是因为每一次迭代我们都只用了四个训练样本,而且加到它们上面的噪声水平还都是随机挑选的。这对于训练来讲并不理想。一种弥补的措施是,我们使用一个非常小的学习率,限制每次更新的幅度。但我们还有一个更好的方法,既能得到和使用更大的 batch size 一样的收益,又不需要让我们的内存爆掉。 + +点击这里看看:[gradient accumulation](https://kozodoi.me/python/deep%20learning/pytorch/tutorial/2021/02/19/gradient-accumulation.html#:~:text=Simply%20speaking%2C%20gradient%20accumulation%20means,might%20find%20this%20tutorial%20useful.)。如果我们多运行几次`loss.backward()`后再调用`optimizer.step()`和`optimizer.zero_grad()`,PyTorch 就会把梯度累积(加和)起来,这样多个批次的数据产生的更新信号就会被高效地融合在一起,产出一个单独的(更好的)梯度估计用于参数更新。这样做会减少参数更新的总次数,就正如我们使用更大的 batch size 时希望看到的一样。梯度累积是一个很多框架都会替你做的事情(比如这里:[🤗 Accelerate makes this easy](https://huggingface.co/docs/accelerate/usage_guides/gradient_accumulation)),但这里我们从头实现一遍也挺好的,因为这对你在 GPU 内存受限时训练模型非常有帮助。正如你在上面代码中看到的那样(在注释 `# Gradient accumulation` 后),其实也不需要你写很多代码。 + + +```python +# 练习:试试你能不能把梯度累积加到第一单元的训练循环中 +# 怎么做呢?你应该怎么基于梯度累积的步数来调整学习率? +# 学习率应该和之前一样吗? +``` + +**考虑因素3:** 即使这样,我们的训练还是挺慢的,而且每遍历完一轮数据集才打印出一行更新,这也不足以让我们知道我们的训练到底怎样了。我们也许还应该: + +* 训练过程中时不时地生成点图像样本,供我们检查模型性能 +* 在训练过程中,把诸如损失值和生成的图片样本在内的一些东西记录到日志里。你可以使用诸如 Weights and Biases 或 tensorboard 之类的工具 + +我创建了一个快速的脚本程序([`finetune_model.py`](https://github.com/huggingface/diffusion-models-class/blob/main/unit2/finetune_model.py)),使用了上述的训练代码并加入了少量日志记录功能。你可以[在这里看看一次训练的日志](https://wandb.ai/johnowhitaker/dm_finetune/runs/2upaa341): + + +```python +%wandb johnowhitaker/dm_finetune/2upaa341 # You'll need a W&B account for this to work - skip if you don't want to log in +``` + + + + + +观察随着训练进展生成的样本图片如何变化也挺好玩 —— 即使从损失值看它好像并没有改进,但我们也能看到一个从原有图像分布(卧室图片)到新的数据集(wikiart 数据集)逐渐演变的过程。在这一节笔记本最后还有一些被注释掉的用于微调的代码,可以使用该脚本程序替代你运行上面的代码块。 + + +```python +# 练习: 看看你能不能修改第一单元的官方示例训练脚本程序 +# 尝试使用预训练的模型,而不是从头开始训练 +# 对比一下上面链接的最小化脚本 —— 对比一下哪些额外功能是最小化脚本没有的? +``` + +用这个模型生成点图片,我们可以看到这些脸看起来极其奇怪! + + +```python +# @markdown Generate and plot some images: +x = torch.randn(8, 3, 256, 256).to(device) # Batch of 8 +for i, t in tqdm(enumerate(scheduler.timesteps)): + model_input = scheduler.scale_model_input(x, t) + with torch.no_grad(): + noise_pred = image_pipe.unet(model_input, t)["sample"] + x = scheduler.step(noise_pred, t, x).prev_sample +grid = torchvision.utils.make_grid(x, nrow=4) +plt.imshow(grid.permute(1, 2, 0).cpu().clip(-1, 1) * 0.5 + 0.5); +``` + + + 0it [00:00, ?it/s] + + + + +![png](01_finetuning_and_guidance_CN_files/01_finetuning_and_guidance_CN_36_1.png) + + + +**考虑因素4:** 微调这个过程可能是难以预知的。如果我们训练很长时间,我们也许能看见一些生成得很完美的蝴蝶,但中间过程从模型自身讲也极其有趣,尤其是你对艺术风格感兴趣时!你可以试试短时间或长时间地观察一下训练过程,并试着该百年学习率,看看这会怎么影响模型的最终输出。 + +### 代码:用我们在WikiArt上面使用最小化样例脚本去微调一个模型 + +如果你想训练一个和我在 WikiArt 类似的模型,你可以去掉代码注释符号,运行下面的代码块。由于这很耗时间和 GPU 内存,我建议你学完这节笔记本后再做。 + + +```python +## 下载微调用的脚本: +# !wget https://github.com/huggingface/diffusion-models-class/raw/main/unit2/finetune_model.py +``` + + +```python +## 运行脚本,在Vintage Face数据集上训练脚本 +## (最好在终端里跑): +# !python finetune_model.py --image_size 128 --batch_size 8 --num_epochs 16\ +# --grad_accumulation_steps 2 --start_model "google/ddpm-celebahq-256"\ +# --dataset_name "Norod78/Vintage-Faces-FFHQAligned" --wandb_project 'dm-finetune'\ +# --log_samples_every 100 --save_model_every 1000 --model_save_name 'vintageface' +``` + +### 保存和载入微调过的管线 + +现在我们已经微调好了我们扩散模型中的 U-Net,我们可以通过下面代码将它保存到本地文件夹中: + + +```python +image_pipe.save_pretrained("my-finetuned-model") +``` + +和我们在第一单元见到的一样,这个过程保存了配置文件、模型、调度器三个东西。 + + +```python +!ls {"my-finetuned-model"} +``` + + model_index.json scheduler unet + + +接下来你可以仿照第一单元 [Introduction to Diffusers](https://github.com/darcula1993/diffusion-models-class-CN/blob/main/unit1/01_introduction_to_diffusers_CN.ipynb) 中的内容把模型上传到Hub中: + + +```python +# @title Upload a locally saved pipeline to the hub + +# Code to upload a pipeline saved locally to the hub +from huggingface_hub import HfApi, ModelCard, create_repo, get_full_repo_name + +# Set up repo and upload files +model_name = "ddpm-celebahq-finetuned-butterflies-2epochs" # @param What you want it called on the hub +local_folder_name = "my-finetuned-model" # @param Created by the script or one you created via image_pipe.save_pretrained('save_name') +description = "Describe your model here" # @param +hub_model_id = get_full_repo_name(model_name) +create_repo(hub_model_id) +api = HfApi() +api.upload_folder( + folder_path=f"{local_folder_name}/scheduler", path_in_repo="", repo_id=hub_model_id +) +api.upload_folder( + folder_path=f"{local_folder_name}/unet", path_in_repo="", repo_id=hub_model_id +) +api.upload_file( + path_or_fileobj=f"{local_folder_name}/model_index.json", + path_in_repo="model_index.json", + repo_id=hub_model_id, +) + +# Add a model card (optional but nice!) +content = f""" +--- +license: mit +tags: +- pytorch +- diffusers +- unconditional-image-generation +- diffusion-models-class +--- + +# Example Fine-Tuned Model for Unit 2 of the [Diffusion Models Class 🧨](https://github.com/huggingface/diffusion-models-class) + +{description} + +## Usage + +```python +from diffusers import DDPMPipeline + +pipeline = DDPMPipeline.from_pretrained('{hub_model_id}') +image = pipeline().images[0] +image +``` +""" + +card = ModelCard(content) +card.push_to_hub(hub_model_id) +``` + + + + + 'https://huggingface.co/lewtun/ddpm-celebahq-finetuned-butterflies-2epochs/blob/main/README.md' + + + +祝贺!你现在微调完了你的第一个扩散模型! + +剩下的部分我将使用一个从[这个在 LSUM bedrooms 数据集上训练过的模型](https://huggingface.co/google/ddpm-bedroom-256)开始在 WikiArt 数据集上微调了大约一轮的[新模型](https://huggingface.co/johnowhitaker/sd-class-wikiart-from-bedrooms)。你也可以跳过这部分代码,使用我们微调过的人脸或蝴蝶管线,或者直接从 Hub 上加载一个模型。 + + +```python +# Load the pretrained pipeline +pipeline_name = "johnowhitaker/sd-class-wikiart-from-bedrooms" +image_pipe = DDPMPipeline.from_pretrained(pipeline_name).to(device) + +# Sample some images with a DDIM Scheduler over 40 steps +scheduler = DDIMScheduler.from_pretrained(pipeline_name) +scheduler.set_timesteps(num_inference_steps=40) + +# Random starting point (batch of 8 images) +x = torch.randn(8, 3, 256, 256).to(device) + +# Minimal sampling loop +for i, t in tqdm(enumerate(scheduler.timesteps)): + model_input = scheduler.scale_model_input(x, t) + with torch.no_grad(): + noise_pred = image_pipe.unet(model_input, t)["sample"] + x = scheduler.step(noise_pred, t, x).prev_sample + +# View the results +grid = torchvision.utils.make_grid(x, nrow=4) +plt.imshow(grid.permute(1, 2, 0).cpu().clip(-1, 1) * 0.5 + 0.5); +``` + + + Downloading: 0%| | 0.00/180 [00:00 more time for the guidance to have an effect +scheduler.set_timesteps(50) + +# We embed a prompt with CLIP as our target +text = open_clip.tokenize([prompt]).to(device) +with torch.no_grad(), torch.cuda.amp.autocast(): + text_features = clip_model.encode_text(text) + + +x = torch.randn(4, 3, 256, 256).to( + device +) # RAM usage is high, you may want only 1 image at a time + +for i, t in tqdm(enumerate(scheduler.timesteps)): + + model_input = scheduler.scale_model_input(x, t) + + # predict the noise residual + with torch.no_grad(): + noise_pred = image_pipe.unet(model_input, t)["sample"] + + cond_grad = 0 + + for cut in range(n_cuts): + + # Set requires grad on x + x = x.detach().requires_grad_() + + # Get the predicted x0: + x0 = scheduler.step(noise_pred, t, x).pred_original_sample + + # Calculate loss + loss = clip_loss(x0, text_features) * guidance_scale + + # Get gradient (scale by n_cuts since we want the average) + cond_grad -= torch.autograd.grad(loss, x)[0] / n_cuts + + if i % 25 == 0: + print("Step:", i, ", Guidance loss:", loss.item()) + + # Modify x based on this gradient + alpha_bar = scheduler.alphas_cumprod[i] + x = ( + x.detach() + cond_grad * alpha_bar.sqrt() + ) # Note the additional scaling factor here! + + # Now step with scheduler + x = scheduler.step(noise_pred, t, x).prev_sample + + +grid = torchvision.utils.make_grid(x.detach(), nrow=4) +im = grid.permute(1, 2, 0).cpu().clip(-1, 1) * 0.5 + 0.5 +Image.fromarray(np.array(im * 255).astype(np.uint8)) +``` + + + 0it [00:00, ?it/s] + + + Step: 0 , Guidance loss: 7.437869548797607 + Step: 25 , Guidance loss: 7.174620628356934 + + + + + + +![png](01_finetuning_and_guidance_CN_files/01_finetuning_and_guidance_CN_62_2.png) + + + + +看起来有点像玫瑰!虽然还不够完美,但你如果接着调一调设定参数,你可以得到一些更令人满意的图片。 + +如果你仔细看上面的代码,你会发现我在使用`alpha_bar.sqrt()`作为因子去缩放梯度。虽然理论上有所谓正确的缩放这些梯度的方法,但在实践中,你可以用实验去验证。对于有些引导来说,你可能希望大部分的引导作用都集中在刚开始的几步里,对于另一些(比如一些关注点在纹理方面的风格损失函数)来讲,你可能希望它仅在生成过程的结束部分加入进来。对此,下面展示一些可能的方案: + + +```python +# @markdown Plotting some possible schedules: +plt.plot([1 for a in scheduler.alphas_cumprod], label="no scaling") +plt.plot([a for a in scheduler.alphas_cumprod], label="alpha_bar") +plt.plot([a.sqrt() for a in scheduler.alphas_cumprod], label="alpha_bar.sqrt()") +plt.plot( + [(1 - a).sqrt() for a in scheduler.alphas_cumprod], label="(1-alpha_bar).sqrt()" +) +plt.legend() +plt.title("Possible guidance scaling schedules"); +``` + + + +![png](01_finetuning_and_guidance_CN_files/01_finetuning_and_guidance_CN_65_0.png) + + + +你可以做点实验,针对不同的调整方案、引导规模大小(`guidance_scale`),以及任何你能想到的小技巧(比如用一个范围去截断梯度也很常见),试试你能把效果做到多好。也可以在其它模型上试试,比如我们最开始使用的那个人脸模型,你能很可靠地让它生成男性脸吗?如果你把 CLIP 引导和前面我们用过地基于颜色的损失函数结合起来用呢? + +如果你看[一些实操的 CLIP 引导的扩散模型代码](https://huggingface.co/spaces/EleutherAI/clip-guided-diffusion/blob/main/app.py),你会发现一种更复杂的方法:使用更好的类别去选取随机图像裁剪,并对损失函数进行许多额外的调整以获得更好的性能。在文本条件扩散模型出现前,这可是最好的文本到图像转换系统!我们这里的“玩具级”项目有很多可改进的空间,但不管怎样,它抓住了核心要点:借助于我们的引导和 CLIP 惊人的能力,我们可以给一个没有条件约束的扩散模型加上文本级的控制 🎨 + +## 把自定义的采样训练做成 Gradio 上的展示来分享 + +也许你现在已经想出了一个很好玩的损失函数去引导生成过程,现在你想把你的微调模型和自定义的采样策略分享给全世界...... + +点击这里了解 [Gradio](https://gradio.app/)。Gradio 是一个免费的开源工具,让用户可以方便地通过一个简单的网页界面来创建和分享交互式的机器学习模型。使用Gradio,用户可以为自己的机器学习模型自定义接口,然后通过一个唯一的URL共享给他人。Gradio 也别集成入了 🤗 Spaces,使得创建 Demo 和共享给他人变得更容易。 + +我们将把我们需要的核心逻辑放在一个函数中,这个函数接收一些输入然后输出一张图片作为输出。然后这个函数会被封装在一个简单的接口中,让用户能自己定义一些参数(这些参数是作为输入提供给 generate 函数的)。这里有很多[组件](https://gradio.app/docs/#components) 可以用 —— 在这个例子中我们就加入了一个滑杆来控制引导的力度(guidance scale),以及一个颜色选择器供我们定义目标颜色。 + + +```python +!pip install -q gradio # Install the library +``` + + +```python +import gradio as gr +from PIL import Image, ImageColor + + +# The function that does the hard work +def generate(color, guidance_loss_scale): + target_color = ImageColor.getcolor(color, "RGB") # Target color as RGB + target_color = [a / 255 for a in target_color] # Rescale from (0, 255) to (0, 1) + x = torch.randn(1, 3, 256, 256).to(device) + for i, t in tqdm(enumerate(scheduler.timesteps)): + model_input = scheduler.scale_model_input(x, t) + with torch.no_grad(): + noise_pred = image_pipe.unet(model_input, t)["sample"] + x = x.detach().requires_grad_() + x0 = scheduler.step(noise_pred, t, x).pred_original_sample + loss = color_loss(x0, target_color) * guidance_loss_scale + cond_grad = -torch.autograd.grad(loss, x)[0] + x = x.detach() + cond_grad + x = scheduler.step(noise_pred, t, x).prev_sample + grid = torchvision.utils.make_grid(x, nrow=4) + im = grid.permute(1, 2, 0).cpu().clip(-1, 1) * 0.5 + 0.5 + im = Image.fromarray(np.array(im * 255).astype(np.uint8)) + im.save("test.jpeg") + return im + + +# See the gradio docs for the types of inputs and outputs available +inputs = [ + gr.ColorPicker(label="color", value="55FFAA"), # Add any inputs you need here + gr.Slider(label="guidance_scale", minimum=0, maximum=30, value=3), +] +outputs = gr.Image(label="result") + +# And the minimal interface +demo = gr.Interface( + fn=generate, + inputs=inputs, + outputs=outputs, + examples=[ + ["#BB2266", 3], + ["#44CCAA", 5], # You can provide some example inputs to get people started + ], +) +demo.launch(debug=True) # debug=True allows you to see errors and output in Colab +``` + +当然你也可以做出点复杂得多的接口,并加入点炫酷的风格和很长的输入序列。这里我们只做最简单的演示。 + +在 🤗 Spaces 上的演示 demo 都是默认用 CPU 跑的,所以在你移交之前,把你的接口在 Colab 上制作原型(如上所示)也是很不错的选择。当你准备好你的 demo 时,你需要创建一个 space,按照 `requirements.txt` 安装程序所需的库,然后把所都代码都放在一个名为 `app.py` 的文件里,这个文件是用来定义相关函数和接口的。 + +![Screenshot from 2022-12-11 10-28-26.png](data:image/png;base64,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) + +幸运的是,你也可以复制一个 space。你可以在[这里](https://huggingface.co/spaces/johnowhitaker/color-guided-wikiart-diffusion)看看我的 demo,然后点击“Duplicate this Space”用我的代码作为一个模板,用于你后续修改代码来添加你自己的模型和引导函数。 + +在设置选项中,你也可以配置你的 space,让它在更厉害的硬件上跑(当然会按小时收费)。如果你确实做出了一些很惊艳的东西、想在更好的硬件上分享它,可是你却不想花钱?那你可以在 Discord 上告诉我们,看我们能不能提供点帮助。 + +## 总结和下一步的工作 + +本节笔记本涵盖了好多内容啊!让我们回顾一下核心要点: +- 载入一个现有模型并用不同的调度器(scheduler)去采样其实很容易 +- 微调(fine-tuning)看起来很像从头训练一个模型,唯一不同的是我们用已有的模型做初始化,以此我们希望能快点得到更好效果 +- 如果在大尺寸图片上微调大模型,我们可以用诸如梯度累积(gradient accumulation)的方法去应对训练时batch size太小的问题 +- 把采样的图片保存到日志里对微调很重要,而损失值曲线却可能无法反映有用的信息 +- 引导(guidance)可以让我们在使用一个没有条件约束的模型时,通过一些引导或损失函数来掌控生成过程。这里我们每步都会找一个损失对于带噪图片x的梯度,然后用梯度更新这个带噪图片,之后再进入下一个生成迭代 +- 用CLIP引导让我们可以用文字描述去控制一个没有条件约束的模型的生成过程! + + +如果你想在实践中运用这些知识,你还可以做这些: +- 微调你自己的模型并把它上传到 Hub。这包括:首先找一个起始点(比如一个在 [faces](https://huggingface.co/google/ddpm-celebahq-256)、[bedrooms](https://huggingface.co/fusing/ddpm-lsun-bedroom)、[cats](https://huggingface.co/fusing/ddpm-lsun-cat) 或 [wikiart example above](https://huggingface.co/johnowhitaker/sd-class-wikiart-from-bedrooms) 数据集上训练过的模型)和一个新的数据集(也许你可以用这个 [animal faces](https://huggingface.co/datasets/huggan/AFHQv2),或者你自己的图片);然后跑一跑这个笔记本中的代码或样例脚本程序。 +- 用你的微调过的模型探索一下引导,你可以用我们例子中的引导函数(颜色损失函数或 CLIP),也可以自己创造一个。 +- 把你的 demo 分享到 Gradio 上,你可以通过修改这里的 [space示例](https://huggingface.co/spaces/johnowhitaker/color-guided-wikiart-diffusion),也可以创建你自己的有更多功能的 space + +我们期待在 Discord、Twitter 或其它地方看到你的作品!🤗 + + +```python + +``` diff --git a/markdown/unit2/01_finetuning_and_guidance_CN_files/01_finetuning_and_guidance_CN_17_1.png b/markdown/unit2/01_finetuning_and_guidance_CN_files/01_finetuning_and_guidance_CN_17_1.png new file mode 100644 index 0000000000000000000000000000000000000000..c228a19e2a0f7c91c38e05b24bd148c42551e3e2 --- /dev/null +++ b/markdown/unit2/01_finetuning_and_guidance_CN_files/01_finetuning_and_guidance_CN_17_1.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid 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503 kB 7.2 MB/s +  |████████████████████████████████| 182 kB 51.3 MB/s + [?25h + + +```python +import torch +import torchvision +from torch import nn +from torch.nn import functional as F +from torch.utils.data import DataLoader +from diffusers import DDPMScheduler, UNet2DModel +from matplotlib import pyplot as plt +from tqdm.auto import tqdm + +device = 'mps' if torch.backends.mps.is_available() else 'cuda' if torch.cuda.is_available() else 'cpu' +print(f'Using device: {device}') +``` + + Using device: cuda + + + +```python +# Load the dataset +dataset = torchvision.datasets.MNIST(root="mnist/", train=True, download=True, transform=torchvision.transforms.ToTensor()) + +# Feed it into a dataloader (batch size 8 here just for demo) +train_dataloader = DataLoader(dataset, batch_size=8, shuffle=True) + +# View some examples +x, y = next(iter(train_dataloader)) +print('Input shape:', x.shape) +print('Labels:', y) +plt.imshow(torchvision.utils.make_grid(x)[0], cmap='Greys'); +``` + + Downloading http://yann.lecun.com/exdb/mnist/train-images-idx3-ubyte.gz + Downloading http://yann.lecun.com/exdb/mnist/train-images-idx3-ubyte.gz to mnist/MNIST/raw/train-images-idx3-ubyte.gz + + + + 0%| | 0/9912422 [00:00] + + + + + +![png](02_class_conditioned_diffusion_model_example_CN_files/02_class_conditioned_diffusion_model_example_CN_10_21.png) + + + +一旦训练结束,我们就可以通过输入不同的标签作为条件,来采样图片了: + + +```python +#@markdown Sampling some different digits: + +# Prepare random x to start from, plus some desired labels y +x = torch.randn(80, 1, 28, 28).to(device) +y = torch.tensor([[i]*8 for i in range(10)]).flatten().to(device) + +# Sampling loop +for i, t in tqdm(enumerate(noise_scheduler.timesteps)): + + # Get model pred + with torch.no_grad(): + residual = net(x, t, y) # Again, note that we pass in our labels y + + # Update sample with step + x = noise_scheduler.step(residual, t, x).prev_sample + +# Show the results +fig, ax = plt.subplots(1, 1, figsize=(12, 12)) +ax.imshow(torchvision.utils.make_grid(x.detach().cpu().clip(-1, 1), nrow=8)[0], cmap='Greys') +``` + + + 0it [00:00, ?it/s] + + + + + + + + + + + +![png](02_class_conditioned_diffusion_model_example_CN_files/02_class_conditioned_diffusion_model_example_CN_12_2.png) + + + +就是这么简单!我们现在已经对要生成的图片有所控制了。 + +希望你喜欢这个例子。一如既往地,如果你有问题,你随时可以在 Discord 上提出来。 + + +```python +# 练习(选做):用同样方法在 FashionMNIST 数据集上试试。调节学习率、batch size 和训练的轮数(epochs)。 +# 你能用比例子更少的训练时间得到些看起来不错的时尚相关的图片吗? +``` diff --git a/markdown/unit2/02_class_conditioned_diffusion_model_example_CN_files/02_class_conditioned_diffusion_model_example_CN_10_21.png b/markdown/unit2/02_class_conditioned_diffusion_model_example_CN_files/02_class_conditioned_diffusion_model_example_CN_10_21.png new file mode 100644 index 0000000000000000000000000000000000000000..d167cf29096f0b3fa2423e1aeac13c260d5f0aeb --- /dev/null +++ b/markdown/unit2/02_class_conditioned_diffusion_model_example_CN_files/02_class_conditioned_diffusion_model_example_CN_10_21.png 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b/markdown/unit2/02_class_conditioned_diffusion_model_example_CN_files/02_class_conditioned_diffusion_model_example_CN_4_9.png new file mode 100644 index 0000000000000000000000000000000000000000..8f0a9bb74bbacc0e0b9bdd0377e26614e8900f00 --- /dev/null +++ b/markdown/unit2/02_class_conditioned_diffusion_model_example_CN_files/02_class_conditioned_diffusion_model_example_CN_4_9.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:79ab7b6fb12e93772e484ba67377701b0c3f08b88e9fdb122403d508308b9282 +size 10316 diff --git a/markdown/unit2/README_CN.md b/markdown/unit2/README_CN.md new file mode 100755 index 0000000000000000000000000000000000000000..7b5f0491b48099b7d48b36f9c42927bc9a173d06 --- /dev/null +++ b/markdown/unit2/README_CN.md @@ -0,0 +1,72 @@ +# 单元2: 微调,引导,条件生成 + +欢迎来到 Hugging Face 扩散模型课程的第二单元!在这一单元,你将会学到新的方法去使用和适配预训练过的扩散模型。你也会看到我们如何创建带有额外输入作为**生成条件**的扩散模型,以此控制生成过程。 + +## 开始这一单元 :rocket: + +这里分几步学习这一单元: + +- 请首先确保你已经[注册了本课程](https://huggingface.us17.list-manage.com/subscribe?u=7f57e683fa28b51bfc493d048&id=ef963b4162),以便有新的学习资料时你会被通知到。 +- 请先通读本文,对本单元的重点有一个整体的认识。 +- 学习 **Fine-tuning and Guidance** 这节的笔记本,试着使用 🤗 Diffusers 库,在一个新数据集上微调(finetune)一个已有的扩散模型,以及用引导(guidance)这一方法修改采样过程。 +- 照着记事本中的示例,把你的自定义模型做成 Gradio 的 Demo 分享出去。 +- (可选)学习 **Class-conditioned Diffusion Model Example** 这节笔记本,看看我们如何给生成过程加入额外控制。 + + +:loudspeaker: 别忘了加入 [Discord](https://huggingface.co/join/discord),在这里你可以参与学习资料的讨论,在`#diffusion-models-class`频道分享你的实验成果。 + +## 微调(Fine-Tuning) + +正如你在第一单元看见的,从头训练一个扩散模型耗费的时间相当长!尤其是当你使用高分辨率图片时,从头训练模型所需的时间和数据量可能多得不切实际。幸运的是,我们还有个解决方法:从一个已经被训练过的模型去开始训练!这样,我们从一个已经学过如何去噪的模型开始,希望能相比于随机初始化的模型能有一个更好的起始点。 + +![Example images generated with a model trained on LSUN Bedrooms and fine-tuned for 500 steps on WikiArt](https://api.wandb.ai/files/johnowhitaker/dm_finetune/2upaa341/media/images/Sample%20generations_501_d980e7fe082aec0dfc49.png) + +一般而言,当你的新数据和原有模型的原始训练数据多多少少有点相似的时候,微调效果会最好(比如你想生成卡通人脸,那你用于微调的模型最好是个在人脸数据上训练过的模型)。但让人吃惊的是,这些益处在图片分布变化显著时也会存在。上面的图片是通过微调一个[在 LSUN 卧室图片数据集上训练的模型](https://huggingface.co/google/ddpm-bedroom-256)而生成的,这个模型在 [WikiArt 数据集](https://huggingface.co/datasets/huggan/wikiart)被微调了500步。相关的[训练脚本](https://github.com/huggingface/diffusion-models-class/blob/main/unit2/finetune_model.py)也放在了本单元中供大家参考。 + +## 引导(Guidance) + +无条件模型一般没有对生成能内容的掌控。我们可以训练一个条件模型(更过内容将会在下节讲述),接收额外输入,以此来操控生成过程。但我们如何使用一个已有的无条件模型去做这件事呢?我们可以用引导这一方法:生成过程中每一步的模型预测都将会被一些引导函数所评估,并加以修改,以此让最终的生成结果符合我们所想。 + +![guidance example image](guidance_eg.png) + +这个引导函数可以是任何函数,这让我们有了很大的设计空间。在笔记本中,我们从一个简单的例子(控制颜色,如上图所示)开始,到使用一个叫CLIP的预训练模型,让生成的结果基于文字描述。 + +## 条件生成(conditioning) + +引导能让我们从一个无条件扩散模型中多少得到些额外的收益,但如果我们在训练过程中就有一些额外的信息(比如图像类别或文字描述)可以输入到模型里,我们可以把这些信息输入模型,让模型使用这些信息去做预测。由此我们就创建了一个条件模型,我们可以在推理阶段通过输入什么信息作为条件来控制模型生成什么。相关的笔记本中就展示了一个例子:一个类别条件的模型,可以根据类别标签生成对应的图像。 + +![conditioning example](conditional_digit_generation.png) + +有很多种方法可以把条件信息输入到模型种,比如: + +* 把条件信息作为额外的通道输入给 UNet。这种情况下一般条件信息都和图片有着相同的形状,比如条件信息是图像分割的掩模(mask)、深度图或模糊版的图像(针对图像修复、超分辨率任务的模型)。这种方法在一些其它条件下也可以用,比如在相应的笔记本的例子中,类别标签就被映射成了一个嵌入(embedding),并被展开成和输入图片一样的宽度和高度,以此来作为额外的通道输入到模型里。 +* 把条件信息做成一个嵌入(embedding),然后把它映射到和模型其中一个或多个中间层输出的通道数一样,再把这个嵌入加到中间层输出上。这一般是以时间步(timestep)为条件时的做法。比如,你可以把时间步的嵌入映射到特定通道数,然后加到模型的每一个残差网络模块的输出上。这种方法在你有一个向量形式的条件时很有用,比如 CLIP 的图像嵌入。一个值得注意的例子是一个[能修改输入图片的Stable Diffusion模型](https://huggingface.co/spaces/lambdalabs/stable-diffusion-image-variations)。 +* 添加有交叉注意力机制的网络层(cross-attention)。这在当条件是某种形式的文字时最有效 —— 比如文字被一个 transformer 模型映射成了一串 embedding,那么UNet中有交叉注意力机制的网络层就会被用来把这些信息合并到去噪路径中。我们将在第三单元研究 Stable Diffusion 如何处理文字信息条件时看到这种情况。 + + +## 用来上手的笔记本示例 + +| Chapter | Colab | Kaggle | Gradient | Studio Lab | +|:--------------------------------------------|:----------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:---------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:---------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:-------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------| +| Fine-tuning and Guidance | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/huggingface/diffusion-models-class/blob/main/unit2/01_finetuning_and_guidance.ipynb) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/huggingface/diffusion-models-class/blob/main/unit2/01_finetuning_and_guidance.ipynb) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/huggingface/diffusion-models-class/blob/main/unit2/01_finetuning_and_guidance.ipynb) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/huggingface/diffusion-models-class/blob/main/unit2/01_finetuning_and_guidance.ipynb) | +| Class-conditioned Diffusion Model Example | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/huggingface/diffusion-models-class/blob/main/unit2/02_class_conditioned_diffusion_model_example.ipynb) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/huggingface/diffusion-models-class/blob/main/unit2/02_class_conditioned_diffusion_model_example.ipynb) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/huggingface/diffusion-models-class/blob/main/unit2/02_class_conditioned_diffusion_model_example.ipynb) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/huggingface/diffusion-models-class/blob/main/unit2/02_class_conditioned_diffusion_model_example.ipynb) | + +现在你已经准备好学习这些笔记本了!通过上面的链接使用你选择的平台打开它们!微调是个计算量很大的工作,所以如果你用的是 Kaggle或 Google Colab,请确保你把运行时类型设成 GPU。 + +本单元内容的主体在 **Fine-tuning and Guidance** 这个笔记本中,我们将通过示例探索这两个话题。笔记本将会展示给你如何在新数据上微调现有模型,添加引导,以及在 Gradio 上分享结果。这里还有一个脚本程序 [finetune_model.py](https://github.com/huggingface/diffusion-models-class/blob/main/unit2/finetune_model.py),让你更容易地实验不同的微调设置;以及一个[示例的 space](https://huggingface.co/spaces/johnowhitaker/color-guided-wikiart-diffusion),你可以以此作为目标用来在 🤗 Spaces 上分享 demo。 + +在 **Class-conditioned Diffusion Model Example** 中,我们用 MNIST 数据集展示一个很简单的例子:创建一个以类别标签为条件的扩散模型。这里的重点在于尽可能简单地讲解核心要点:通过给模型提供额外的关于去除什么噪声的信息,我们可以在推理时控制哪种类型的图片是我们想要生成的。 + +## 项目时间 + +仿照 **Fine-tuning and Guidance** 笔记本中的例子,微调你自己的模型或挑选一个现有模型,创建 Gradio 的 demo 展示你的引导技巧。也不要忘了在 Discord 或 Twitter 之类的平台上分享,让我们也羡慕羡慕! + +## 一些其它学习资源 + +[Denoising Diffusion Implicit Models](https://arxiv.org/abs/2010.02502) - 引出了DDIM采样方法(DDIMScheduler 用到了这个方法) + +[GLIDE: Towards Photorealistic Image Generation and Editing with Text-Guided Diffusion Models](https://arxiv.org/abs/2112.10741) - 介绍了如何让扩散模型基于文本类条件 + +[eDiffi: Text-to-Image Diffusion Models with an Ensemble of Expert Denoisers](https://arxiv.org/abs/2211.01324) - 介绍了不同种类的生成条件一起使用时的情况,以此更加广泛地控制生成过程 + +如果你找到了更好的学习资源,也别忘了告诉我们让我们加到这个列表里! diff --git a/markdown/unit2/conditional_digit_generation.png b/markdown/unit2/conditional_digit_generation.png new file mode 100644 index 0000000000000000000000000000000000000000..1f18a67f2627c9b4b72142ecc1a1c734495c0f1d --- /dev/null +++ b/markdown/unit2/conditional_digit_generation.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:3a3c1b5f4583c173037028134f889507cc936c2489b6bfd75151ae02bd6e5839 +size 102391 diff --git a/markdown/unit2/finetune_model.py b/markdown/unit2/finetune_model.py new file mode 100644 index 0000000000000000000000000000000000000000..57dc73c0726ee783b2c9d4686955ce3b419cd44f --- /dev/null +++ b/markdown/unit2/finetune_model.py @@ -0,0 +1,120 @@ +import wandb +import numpy as np +import torch, torchvision +import torch.nn.functional as F +from PIL import Image +from tqdm.auto import tqdm +from fastcore.script import call_parse +from torchvision import transforms +from diffusers import DDPMPipeline +from diffusers import DDIMScheduler +from datasets import load_dataset +from matplotlib import pyplot as plt + +@call_parse +def train( + image_size = 256, + batch_size = 16, + grad_accumulation_steps = 2, + num_epochs = 1, + start_model = "google/ddpm-bedroom-256", + dataset_name = "huggan/wikiart", + device='cuda', + model_save_name='wikiart_1e', + wandb_project='dm_finetune', + log_samples_every = 250, + save_model_every = 2500, + ): + + # Initialize wandb for logging + wandb.init(project=wandb_project, config=locals()) + + + # Prepare pretrained model + image_pipe = DDPMPipeline.from_pretrained(start_model); + image_pipe.to(device) + + # Get a scheduler for sampling + sampling_scheduler = DDIMScheduler.from_config(start_model) + sampling_scheduler.set_timesteps(num_inference_steps=50) + + # Prepare dataset + dataset = load_dataset(dataset_name, split="train") + preprocess = transforms.Compose( + [ + transforms.Resize((image_size, image_size)), + transforms.RandomHorizontalFlip(), + transforms.ToTensor(), + transforms.Normalize([0.5], [0.5]), + ] + ) + def transform(examples): + images = [preprocess(image.convert("RGB")) for image in examples["image"]] + return {"images": images} + dataset.set_transform(transform) + train_dataloader = torch.utils.data.DataLoader(dataset, batch_size=batch_size, shuffle=True) + + + # Optimizer & lr scheduler + optimizer = torch.optim.AdamW(image_pipe.unet.parameters(), lr=1e-5) + scheduler = torch.optim.lr_scheduler.ExponentialLR(optimizer, gamma=0.9) + + for epoch in range(num_epochs): + for step, batch in tqdm(enumerate(train_dataloader), total=len(train_dataloader)): + + # Get the clean images + clean_images = batch['images'].to(device) + + # Sample noise to add to the images + noise = torch.randn(clean_images.shape).to(clean_images.device) + bs = clean_images.shape[0] + + # Sample a random timestep for each image + timesteps = torch.randint(0, image_pipe.scheduler.num_train_timesteps, (bs,), device=clean_images.device).long() + + # Add noise to the clean images according to the noise magnitude at each timestep + # (this is the forward diffusion process) + noisy_images = image_pipe.scheduler.add_noise(clean_images, noise, timesteps) + + # Get the model prediction for the noise + noise_pred = image_pipe.unet(noisy_images, timesteps, return_dict=False)[0] + + # Compare the prediction with the actual noise: + loss = F.mse_loss(noise_pred, noise) + + # Log the loss + wandb.log({'loss':loss.item()}) + + # Calculate the gradients + loss.backward() + + # Gradient Acccumulation: Only update every grad_accumulation_steps + if (step+1)%grad_accumulation_steps == 0: + optimizer.step() + optimizer.zero_grad() + + # Occasionally log samples + if (step+1)%log_samples_every == 0: + x = torch.randn(8, 3, 256, 256).to(device) # Batch of 8 + for i, t in tqdm(enumerate(sampling_scheduler.timesteps)): + model_input = sampling_scheduler.scale_model_input(x, t) + with torch.no_grad(): + noise_pred = image_pipe.unet(model_input, t)["sample"] + x = sampling_scheduler.step(noise_pred, t, x).prev_sample + grid = torchvision.utils.make_grid(x, nrow=4) + im = grid.permute(1, 2, 0).cpu().clip(-1, 1)*0.5 + 0.5 + im = Image.fromarray(np.array(im*255).astype(np.uint8)) + wandb.log({'Sample generations': wandb.Image(im)}) + + # Occasionally save model + if (step+1)%save_model_every == 0: + image_pipe.save_pretrained(model_save_name+f'step_{step+1}') + + # Update the learning rate for the next epoch + scheduler.step() + + # Save the pipeline one last time + image_pipe.save_pretrained(model_save_name) + + # Wrap up the run + wandb.finish() diff --git a/markdown/unit2/guidance_eg.png b/markdown/unit2/guidance_eg.png new file mode 100644 index 0000000000000000000000000000000000000000..da81f4da14cfb3e7b869aa983ac76d99643b05cf --- /dev/null +++ b/markdown/unit2/guidance_eg.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:71e0eae7cbdd4d019c1848bac3578185b1f4e9c5ecfbbd37d784bc32e5143411 +size 382274 diff --git a/markdown/unit3/01_stable_diffusion_introduction_CN.md b/markdown/unit3/01_stable_diffusion_introduction_CN.md new file mode 100644 index 0000000000000000000000000000000000000000..a00a8630ac3e97460f375121f3c3f37639dbcbea --- /dev/null +++ b/markdown/unit3/01_stable_diffusion_introduction_CN.md @@ -0,0 +1,583 @@ +# 简介 + +本节笔记本将会涵盖一些基础性的内容,介绍如何利用现有的管线(pipeline)借助 Stable Diffusion 模型来创造和修改图片。我们也将简要一览管线内的关键组成部分,把更进一步的探究任务留给更深入介绍的一节笔记本中。特别地,我们将涵盖以下内容: +- 利用 `StableDiffusionPipeline` 根据文字描述生成图片,并通过修改各个输入参数来进行探究实验 +- 实操了解管线的一些关键组成部分: + - 让这个模型成为“隐编码扩散模型(latent diffusion model)”的可变分自编码器(VAE) + - 处理文本提示的分词器(tokenizer)和文本编码器 + - UNet 模型本身 + - 使用的调度器(scheduler),以及其它不同的调度器 +- 使用管线的组成部分来复现采样循环 +- 用Img2Im管线来编辑现有图片 +- 使用inpainting管线和Depth2Img管线 + +❓如果你有问题,请在 Hugging Face Discord 的 `#diffusion-models-class` 频道提出。如果你还没有 Hugging Face 的账号,你可以在这里注册:https://huggingface.co/join/discord + + +# 配置 + + +```python +!pip install -Uq diffusers ftfy accelerate +``` + + +```python +# Installing transformers from source for now since we need the latest version for Depth2Img: +!pip install -Uq git+https://github.com/huggingface/transformers +``` + + +```python +import torch +import requests +from PIL import Image +from io import BytesIO +from matplotlib import pyplot as plt + +# We'll be exploring a number of pipelines today! +from diffusers import ( + StableDiffusionPipeline, + StableDiffusionImg2ImgPipeline, + StableDiffusionInpaintPipeline, + StableDiffusionDepth2ImgPipeline + ) + +# We'll use a couple of demo images later in the notebook +def download_image(url): + response = requests.get(url) + return Image.open(BytesIO(response.content)).convert("RGB") + +# Download images for inpainting example +img_url = "https://raw.githubusercontent.com/CompVis/latent-diffusion/main/data/inpainting_examples/overture-creations-5sI6fQgYIuo.png" +mask_url = "https://raw.githubusercontent.com/CompVis/latent-diffusion/main/data/inpainting_examples/overture-creations-5sI6fQgYIuo_mask.png" + +init_image = download_image(img_url).resize((512, 512)) +mask_image = download_image(mask_url).resize((512, 512)) +``` + + +```python +# Set device +device = ( + "mps" + if torch.backends.mps.is_available() + else "cuda" + if torch.cuda.is_available() + else "cpu" +) +``` + +# 从文本生成图像 + +我们先载入 Stable Diffusion 的管线,看看我们能做点什么。现有的 Stable Diffusion 模型有好多不同版本,截至本文书写时的最新版本是第2.1版。如果你想探究更旧的版本,只需要在 `model_id` 处修改即可(比如你可以试试将其改成 `CompVis/stable-diffusion-v1-4` 或从[dreambooth concepts library](https://huggingface.co/sd-dreambooth-library)选一个模型)。 + + +```python +# Load the pipeline +model_id = "stabilityai/stable-diffusion-2-1-base" +pipe = StableDiffusionPipeline.from_pretrained(model_id).to(device) +``` + +如果你的GPU内存不够用,这里有些办法也许可以减少内存使用: +- 载入 FP16 精度的版本(但并不是所有的系统上都支持)。与此同时,在你对管线的某个特定部分实验时,你也需要把所有的张量换成 torch.float16 精度: + + `pipe = StableDiffusionPipeline.from_pretrained(model_id, revision="fp16", torch_dtype=torch.float16).to(device)` + + +- 开启注意力机制切分(attention slicing)。这会牺牲一点点速度来减少GPU内存的使用: + + `pipe.enable_attention_slicing()` + + +- 降低要生成的图片的尺寸 + +当管线加载好了以后,我们可以用以下代码去使用文字提示生成图片: + + +```python +# Set up a generator for reproducibility +generator = torch.Generator(device=device).manual_seed(42) + +# Run the pipeline, showing some of the available arguments +pipe_output = pipe( + prompt="Palette knife painting of an autumn cityscape", # What to generate + negative_prompt="Oversaturated, blurry, low quality", # What NOT to generate + height=480, width=640, # Specify the image size + guidance_scale=8, # How strongly to follow the prompt + num_inference_steps=35, # How many steps to take + generator=generator # Fixed random seed +) + +# View the resulting image: +pipe_output.images[0] +``` + + + 0%| | 0/35 [00:00 decoded token") +for input_id in input_ids[0]: + print(f"{input_id} -> {pipe.tokenizer.decode(input_id)}") + +# Feed through CLIP text encoder +input_ids = torch.tensor(input_ids).to(device) +with torch.no_grad(): + text_embeddings = pipe.text_encoder(input_ids)['last_hidden_state'] +print("Text embeddings shape:", text_embeddings.shape) +``` + + Input ID -> decoded token + 49406 -> <|startoftext|> + 320 -> a + 3086 -> painting + 539 -> of + 320 -> a + 4062 -> floo + 1059 -> ble + 49407 -> <|endoftext|> + Text embeddings shape: torch.Size([1, 8, 1024]) + + + +```python +# Get the final text embeddings using the pipeline's _encode_prompt function: +text_embeddings = pipe._encode_prompt("A painting of a flooble", device, 1, False, '') +text_embeddings.shape +``` + + + + + torch.Size([1, 77, 1024]) + + + +这些文本嵌入(text embedding),也即文本编码器中最后一个transformer模块的“隐状态(hidden state)”,将会被送入 UNet 中作为 `forward` 函数的一个额外输入,下面部分我们会详细看到。 + +### UNet + +![unet.png](data:image/png;base64,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) + +UNet 模型接收一个带噪的输入,并预测噪声,和我们之前单元中看到的 UNet 一样。但与以往例子不同的是,这里的输入并不是图片了,而是图片的隐式表示形式(latent representation)。此外,除了把用于暗示带噪程度的timestep输入进 UNet 作为条件外,这里模型也把文字提示(prompt)的文本嵌入(text embeddings)作为了额外输入。这里我们假数据试着让它预测一下: + + +```python +# Dummy inputs: +timestep = pipe.scheduler.timesteps[0] +latents = torch.randn(1, 4, 64, 64).to(device) +text_embeddings = torch.randn(1, 77, 1024).to(device) + +# Model prediction: +with torch.no_grad(): + unet_output = pipe.unet(latents, timestep, text_embeddings).sample +print('UNet output shape:', unet_output.shape) # Same shape as the input latents +``` + + UNet output shape: torch.Size([1, 4, 64, 64]) + + +### 调度器(Scheduler) + +调度器保存了如何加噪的计划安排,管理着如何基于模型的预测更新带噪样本。默认的调度器是 `PNDMScheduler` 调度器,但你也可以用其它的(比如 `LMSDiscreteScheduler` 调度器),只要它们用相同的配置初始化。 + +我们可以画出图像来观察随着timestep添加噪声的计划安排,看看不同时间的噪声水平(基于$\bar{\alpha}$这个参数)是什么样的: + + +```python +plt.plot(pipe.scheduler.alphas_cumprod, label=r'$\bar{\alpha}$') +plt.xlabel('Timestep (high noise to low noise ->)'); +plt.title('Noise schedule');plt.legend(); +``` + + + +![png](01_stable_diffusion_introduction_CN_files/01_stable_diffusion_introduction_CN_35_0.png) + + + +如果你想尝试不同的调度器,你可以像下面代码中一样换一个新的: + + +```python +from diffusers import LMSDiscreteScheduler + +# Replace the scheduler +pipe.scheduler = LMSDiscreteScheduler.from_config(pipe.scheduler.config) + +# Print the config +print('Scheduler config:', pipe.scheduler) + +# Generate an image with this new scheduler +pipe(prompt="Palette knife painting of an winter cityscape", height=480, width=480, + generator=torch.Generator(device=device).manual_seed(42)).images[0] +``` + + Scheduler config: LMSDiscreteScheduler { + "_class_name": "LMSDiscreteScheduler", + "_diffusers_version": "0.11.1", + "beta_end": 0.012, + "beta_schedule": "scaled_linear", + "beta_start": 0.00085, + "clip_sample": false, + "num_train_timesteps": 1000, + "prediction_type": "epsilon", + "set_alpha_to_one": false, + "skip_prk_steps": true, + "steps_offset": 1, + "trained_betas": null + } + + + + + 0%| | 0/50 [00:00 x_t-1 + latents = pipe.scheduler.step(noise_pred, t, latents).prev_sample + +# Decode the resulting latents into an image +with torch.no_grad(): + image = pipe.decode_latents(latents.detach()) + +# View +pipe.numpy_to_pil(image)[0] +``` + + + + + +![png](01_stable_diffusion_introduction_CN_files/01_stable_diffusion_introduction_CN_40_0.png) + + + + +大多数情况下,还是使用现有的管线更方便,但我们这里手动拼装采样循环会更有益于我们理解每个部分如何工作、以及如何根据需要修改这些组件。如果你想看看实际的代码以及深入了解如何修改这些组成部分,你可以参考 Stable Diffusion Deep Dive 这个[笔记本](https://github.com/fastai/diffusion-nbs/blob/master/Stable%20Diffusion%20Deep%20Dive.ipynb)和[视频](https://m.youtube.com/watch?v=0_BBRNYInx8)。这里有对相关内容更全面彻底的探究。 + +# 其它的一些管线 + +那我们除了从文字提示生成图片外还能做点什么呢?其实还有很多!这一部分还会向你展示几个很酷的管线,让你了解一些其它的可以应用 Stable Diffusion 的任务。这里面有几个管线需要你下载新的模型,所以你要是着急的话你也可以跳过这一部分,只看看现有的输出展示就行,不必亲自下载和运行模型。 + +## Img2Img + +直到现在,我们生成的图片还都是完全从随机的隐变量来开始生成的,而且也都使用了完整的扩散模型采样循环。但其实我们不必从头开始。Img2Img 这个管线首先将一张已有的图片进行编码,编码成一系列的隐变量,然后在这些隐变量上随机加噪声,以这些作为起始点。噪声加多大量、去噪需要的步数决定了这个 img2img 过程的“强度”。只加一点点噪声(强度低)只会带来微小改变,而加入最大量的噪声并跑完完整的去噪过程又会生成出几乎完全不像原始图片的结果,即使可能在整体结构上还多少有点相似。 + +这个管线无需什么特殊模型,只要模型的 ID 和我们的文字到图像模型一样就行,没有新的需要下载的文件。 + + +```python +# Loading an Img2Img pipeline +model_id = "stabilityai/stable-diffusion-2-1-base" +img2img_pipe = StableDiffusionImg2ImgPipeline.from_pretrained(model_id).to(device) +``` + + + Fetching 16 files: 0%| | 0/16 [00:00 +_示例图片,由 Stable Diffusion 生成_ + +Stable Diffusion 是一个强大的文本条件隐式扩散模型(text-conditioned latent diffusion model)。不要担心,我们马上就会解释这些名词。它根据文字描述生成令人惊艳的图片的能力震惊了整个互联网。在本单元,我们将会一探 SD 的工作原理并了解一下它还能搞出什么其它花招。 + +## 隐式扩散(Latent Diffusion) + +当图片尺寸变大时,需要的计算能力也随之增加。这种现象在自注意力机制(self-attention)这种操作的影响下尤为突出,因为操作数随着输入量的增大呈平方地增加。一个 128px 的正方形图片有着四倍于 64px 正方形图片的像素数量,所以在自注意力层就需要16倍(42)的内存和计算量。这是任何需要生成高分辨率图片的人都会遇到的问题。 + +![latent diffusion diagram](https://github.com/CompVis/latent-diffusion/raw/main/assets/modelfigure.png)
+_Diagram from the [Latent Diffusion paper](http://arxiv.org/abs/2112.10752)_ + +隐式扩散致力于克服这一难题,它使用一个独立的模型 Variational Auto-Encoder(VAE)**压缩**图片到一个更小的空间维度。这背后的原理是,图片通场都包含了大量的冗余信息 —— 给定足够的训练数据,一个 VAE 可以学会产出一个比输入图片小得多的表征,并把这个**隐式**表征重建回原图片,同时保留较高的保真度。SD 模型中的 VAE 接收一个三通道图片输入,生成出一个四通道的隐式表征,同时每一个空间维度上都减少为原来的八分之一。比如,一个 512px 的正方形图片将会被压缩到一个 4×64×64 的隐式表征上。 + +通过把扩散过程引用到这些**隐式表征**而不是完整图像上,我们可以从中得到很多好处(更低的内存使用、更少的 UNet 层数、更快的生成速度...)。同时我们仍能把结果使用 VAE 中的解码器解码到高分辨率图片上来查看最终结果。这一创新点极大地降低了训练和运行这些模型的成本。 + +## 以文本为生成条件 + +在第二单元,我们展示了如何将额外信息输入到 UNet,让我们对生成的图片有了额外的控制。我们把这种方法叫做条件生成。给定一个带噪图片,我们让模型**基于额外的线索**(比如类别标签,或 Stable Diffusion 中的文字描述)去预测去噪的版本。在推理阶段,我们可以输入对期望图片的文字表述和纯噪声数据作为起始点,然后模型就开始全力对随机输入进行“去噪”,以求生成的图片能匹配上文字描述。 + +![text encoder diagram](text_encoder_noborder.png)
+_图表:文本编码过程,即将输入的文本提示转化为一系列的文本嵌入(即图中的 encoder_hidden_states),然后输入 Unet 作为生成条件_ + +为了达成这一目的,我们首先需要为文本创建一个数值的表示形式,用来获取文字描述的相关信息。为此,SD 利用了一个名为CLIP的预训练transformer模型。CLIP 的文本编码器是用来处理图像说明文字、将其转换为可以用来对比图片和文本的形式的。所以这个模型非常适合用来从文字描述来为图像创建有用的表征信息。一个输入文字提示会首先被分词(tokenize,基于一个很大的词汇库把句中的词语或短语转化为一个个的token),然后被输入进 CLIP 的文字编码器,为每个token产出一个 768 维(针对 SD 1.X版本)或1024维(针对SD 2.X版本)的向量。为了使得输入格式一致,文本提示总是被补全或截断到含有 77 个 token 的长度,所以每个文字提示最终作为生成条件的表示形式是一个形状为 77×1024 的张量。 + +![conditioning diagram](sd_unet_color.png) + +那我们如何实际地将这些条件信息输入到 UNet 里让它预测使用呢?答案是使用交叉注意力机制(cross-attention)。交叉注意力层从头到尾贯穿了 UNet 结构。UNet 中的每个空间位置都可以“注意”文字条件中不同的token,以此从文字提示中获取到了不同位置的相互关联信息。上面的图表就展示了文字条件信息(以及基于时间周期 time-step 的条件)是如何在不同的位置点输入的。 可以看到,UNet 的每一层都由充足的机会去利用这些条件信息! + +## 无分类器的引导 + +然而很多时候,即使我们付出了很多努力尽可能让文本成为生成的条件,但模型仍然会在预测时大量地基于带噪输入图片,而不是文字。在某种程度上,这其实是可以解释得通的 —— 很多说明文字和与之关联的图片相关性很弱,所以模型就学着不去过度依赖文字描述!可是这并不是我们期望的效果。如果模型不遵从文本提示,那么我们很可能得到与我们描述根本不相关的图片。 + +![CFG scale demo grid](cfg_example_0_1_2_10.jpeg)
+_由描述 "An oil painting of a collie in a top hat" 生成的图片(从左到右的 CFG scale 分别是 0、1、2、10)_ + +为了解决这一问题,我们使用了一个小技巧,叫做无分类器的引导(Classifie-free Guidance,CGF)。在训练时,我们时不时把文字条件置空,强迫模型去学着在无文字信息的情况下对图片去噪(无条件生成)。在推理阶段,我们分别做两个预测:一个有文字条件,一个没有。我们可以用这两者的差异来建立一个最终结合版的预测,让最终结果在文本条件预测所指明的方向上依据一个缩放系数(即引导尺度)去“走得更远”,希望最终生成一个更好地匹配文字提示的结果。上图就展示了在同一个文本提示下使用不同引导尺度得到的不同结果。可以看到,更高的引导尺度能让生成的图片更接近文字描述。 + +## 其它类型的条件生成:超分辨率、图像修补、深度图到图像的转换 + +我们也可以创建各种接收不同生成条件的 Stable Diffusion 模型。比如[深度图到图像转换模型](https://huggingface.co/stabilityai/stable-diffusion-2-depth)使用一个额外的输入通道接收要被去噪的图片的深度信息。所以在推理阶段,我们就可以输入一个目标图片的深度图(由另一个独立的模型预测出来),以此来希望模型生成一个有相似全局结构的图片。 + +![depth to image example](https://huggingface.co/stabilityai/stable-diffusion-2-depth/resolve/main/depth2image.png)
+_基于深度的 SD 模型可以根据同一个全局结构生成不同的图片(示例来自StabilityAI)_ + +用相似的方式,我们也可以输入一个低分辨率图片作为条件,让模型生成对应的高分辨率图片([正如Stable Diffusion Upscaler](https://huggingface.co/stabilityai/stable-diffusion-x4-upscaler)一样)。此外,我们还可以输入一个掩膜(mask),让模型知道图像相应的区域需要让模型用in-painting的方式重新生成一下:掩膜外的区域要和原图片保持一致,掩膜内的区域要生成出新的内容。 + +## 使用 DreamBooth 微调 + +![dreambooth diagram](https://dreambooth.github.io/DreamBooth_files/teaser_static.jpg) +_由 Imagen model 生成的图片,来自[dreambooth 项目页](https://dreambooth.github.io/)_ + +DreamBooth 可以用来微调一个文字到图像的生成模型,教它一些新的概念,比如某一特定物体或某种特定风格。这一技术一开始是为 Google 的 Imagen Model 开发的,但被很快应用于 [stable diffusion](https://huggingface.co/docs/diffusers/training/dreambooth) 中。效果十分惊艳(如果你最近在社交媒体上看到谁使用了 AI 生成的头像,那这个头像有很大概率是出自于基于 DreamBooth 的服务),但该技术也对各种设置十分敏感。所以请学习我们这一单元的笔记本,并阅读[这个对不同训练参数的调研资料](https://huggingface.co/blog/dreambooth)来获取些参考,让模型尽可能地起作用。 + +## 用来上手的笔记本示例 + +| Chapter | Colab | Kaggle | Gradient | Studio Lab | +|:--------------------------------------------|:----------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:---------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:---------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:-------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------| +| Stable Diffusion Introduction | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/huggingface/diffusion-models-class/blob/main/unit3/01_stable_diffusion_introduction.ipynb) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/huggingface/diffusion-models-class/blob/main/unit3/01_stable_diffusion_introduction.ipynb) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/huggingface/diffusion-models-class/blob/main/unit3/01_stable_diffusion_introduction.ipynb) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/huggingface/diffusion-models-class/blob/main/unit3/01_stable_diffusion_introduction.ipynb) | +| DreamBooth Hackathon Notebook | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/huggingface/diffusion-models-class/blob/main/hackathon/dreambooth.ipynb) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/huggingface/diffusion-models-class/blob/main/hackathon/dreambooth.ipynb) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/huggingface/diffusion-models-class/blob/main/hackathon/dreambooth.ipynb) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/huggingface/diffusion-models-class/blob/main/hackathon/dreambooth.ipynb) | +| Stable Diffusion Deep Dive | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/fastai/diffusion-nbs/blob/master/Stable%20Diffusion%20Deep%20Dive.ipynb ) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/fastai/diffusion-nbs/blob/master/Stable%20Diffusion%20Deep%20Dive.ipynb ) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/fastai/diffusion-nbs/blob/master/Stable%20Diffusion%20Deep%20Dive.ipynb ) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/fastai/diffusion-nbs/blob/master/Stable%20Diffusion%20Deep%20Dive.ipynb ) | + +至此,你已经准备好学习相关笔记本了!通过上面的链接使用你选择的平台打开它们!DreamBooth 需要的算力比较多,所以如果你是用的 Kaggle 或 Google Colab,那请确保将运行时模式设为 GPU 来获得最好效果。 + +Stable Diffusion Introduction 这节笔记本是使用🤗 Diffusers 库对 Stable Diffusion 所作的一个简短介绍,包含了一些基本的使用管线生成和修改图片的示例。 + +在 DreamBooth Hackathon 这节笔记本(在 [hackathon 文件夹里](../hackathon))中,我们展示了如何使用你自己的图片微调 SD,来获取一个涵盖新的风格或内容的自定义版本模型。 + +最后,在 Stable Diffusion Deep Dive 笔记本中和视频中,我们分解了一个典型的生成管线中的每一个步骤,并提出了一些新奇的方法去对每一步进行修改,来有创造性地控制生成。 + +## 项目时间 + +仿照 **DreamBooth** 笔记本中的指导,针对某个特定种类的数据训练你自己的模型。请确保在提交时加入一些输出的例子,以便我们为不同的种类数据选出最好的模型!请查阅 [hackathon 信息](../hackathon),进一步了解关于奖项、GPU额度等信息。 + +## 一些其它学习资源 + +- [High-Resolution Image Synthesis with Latent Diffusion Models](http://arxiv.org/abs/2112.10752) - 这篇论文介绍了 Stable Diffusion 背后的方法 + +- [CLIP](https://openai.com/blog/clip/) - CLIP 学习着去将文字和图片联系起来,CLIP 文本编码器被用来将文本提示转化为 SD 使用的信息量丰富的数值表征形式。也可查阅 [这篇关于 OpenCLIP 的文献](https://wandb.ai/johnowhitaker/openclip-benchmarking/reports/Exploring-OpenCLIP--VmlldzoyOTIzNzIz),了解最近的一些 CLIP 开源版本(其中一个被用于第二版 SD 模型)。 + +- [GLIDE: Towards Photorealistic Image Generation and Editing with Text-Guided Diffusion Models](https://arxiv.org/abs/2112.10741) 是一篇较早的论文,介绍了把文本作为生成条件以及 CFG 相关内容。 + +如果你找到了更好的学习资源,也别忘了告诉我们让我们加到这个列表里! diff --git a/markdown/unit3/cfg_example_0_1_2_10.jpeg b/markdown/unit3/cfg_example_0_1_2_10.jpeg new file mode 100644 index 0000000000000000000000000000000000000000..b685f6157517a933e19755425d207fc6dea72a35 --- /dev/null +++ b/markdown/unit3/cfg_example_0_1_2_10.jpeg @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:a5d9636a1381fe0e9570774ddda7a88d23fe01c52fa4ae563850686efc84a685 +size 204059 diff --git a/markdown/unit3/sd_demo_images.jpg b/markdown/unit3/sd_demo_images.jpg new file mode 100644 index 0000000000000000000000000000000000000000..5f2770e21c196774cb52ab55d5dfee2bf9721bd6 --- /dev/null +++ b/markdown/unit3/sd_demo_images.jpg @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:cfd6aca118d829e505cfb60167f6020c5e9680690bd747b50e38350b8377d6a8 +size 227696 diff --git a/markdown/unit3/sd_unet_color.png b/markdown/unit3/sd_unet_color.png new file mode 100644 index 0000000000000000000000000000000000000000..4ac89f297f2b9a6c90933a84db65d6d3380387fa --- /dev/null +++ b/markdown/unit3/sd_unet_color.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:9a66f5943946a88a8e39ac686fb7d4d7d13acd740b2f8f146c7f1e01dec340a7 +size 190494 diff --git a/markdown/unit3/text_encoder_noborder.png b/markdown/unit3/text_encoder_noborder.png new file mode 100644 index 0000000000000000000000000000000000000000..9c534a526fc61c0aafc0ded3eefb3d18365d5edb --- /dev/null +++ b/markdown/unit3/text_encoder_noborder.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:befb00d52c33291fb23739e1214ab4977a1b6476d56b199b13a1e310997f6a0f +size 55584 diff --git a/markdown/unit4/01_ddim_inversion_CN.md b/markdown/unit4/01_ddim_inversion_CN.md new file mode 100644 index 0000000000000000000000000000000000000000..9802309d168520a4e7c6fb7b39dc6937e922a49d --- /dev/null +++ b/markdown/unit4/01_ddim_inversion_CN.md @@ -0,0 +1,570 @@ +# DDIM反转 + +在此篇笔记我们会来探索**反转**,看看它是如何影响取样的,并把它应用到扩散模型的编辑图像功能中去。 + +## 你将会学到什么 + +- DDIM采样是怎么工作的 +- 确定性vs随机性取样器 +- DDIM反转的理论支撑 +- 使用反转来编辑图像 + +我们开始吧! + +## 设置 + + +```python +# !pip install -q transformers diffusers accelerate +``` + + +```python +import torch +import requests +import torch.nn as nn +import torch.nn.functional as F +from PIL import Image +from io import BytesIO +from tqdm.auto import tqdm +from matplotlib import pyplot as plt +from torchvision import transforms as tfms +from diffusers import StableDiffusionPipeline, DDIMScheduler + +# Useful function for later +def load_image(url, size=None): + response = requests.get(url,timeout=0.2) + img = Image.open(BytesIO(response.content)).convert('RGB') + if size is not None: + img = img.resize(size) + return img +``` + + +```python +device = torch.device("cuda" if torch.cuda.is_available() else "cpu") +``` + +## 加载一个已训练的pipeline + + +```python +# Load a pipeline +pipe = StableDiffusionPipeline.from_pretrained("runwayml/stable-diffusion-v1-5").to(device) +``` + + +```python +# Set up a DDIM scheduler: +pipe.scheduler = DDIMScheduler.from_config(pipe.scheduler.config) +``` + + +```python +# Sample an image to make sure it is all working +prompt = 'Beautiful DSLR Photograph of a penguin on the beach, golden hour' +negative_prompt = 'blurry, ugly, stock photo' +im = pipe(prompt, negative_prompt=negative_prompt).images[0] +im.resize((256, 256)) # resize for convenient viewing +``` + +## DDIM取样过程 + +在给定时间 $t$, 带噪图像 $x_t$ 是原始图像($x_0$)与一些噪声 ($\epsilon$)的叠加。这是在DDIM论文中$x_t$的定义式,我们把它引用到此节里: + +$$ x_t = \sqrt{\alpha_t}x_0 + \sqrt{1-\alpha_t}\epsilon $$ + +$\epsilon$ 是一些归一方差的高斯噪声 +$\alpha_t$ ('alpha')在DDPM论文中也被叫做$\bar{\alpha}$ ('alpha_bar'),被用来定义噪声调度器(scheduler)。在扩散模型中,alpha调度器是被计算出来并排序存储在`scheduler.alphas_cumprod`中。这令人费解,我理解!我们把这些值画出来,然后在下文中我们会使用DDIM的标注方式。 + + +```python +# Plot 'alpha' (alpha_bar in DDPM language, alphas_cumprod in diffusers for clarity) +timesteps = pipe.scheduler.timesteps.cpu() +alphas = pipe.scheduler.alphas_cumprod[timesteps] +plt.plot(timesteps, alphas, label='alpha_t'); +plt.legend(); +``` + +最初(timestep 0 ,图中左侧)是从一个无噪的干净图像开始,$\alpha_t = 1$。当我们到达更高的timesteps,我们得到一个几乎全是噪声的图像,$\alpha_t$也几乎下降到0。 + +在采样过程,我们从timestep1000的纯噪声开始,慢慢地向timestep0前进。为了计算采样轨迹中的下一时刻($x_{t-1}$因为我们是从后向前移动)的值,我们预测噪声($\epsilon_\theta(x_t)$,这就是我们模型的输出),用它来预测出无噪的图片$x_0$。在这之后我们用这个预测结果朝着'$x_t$的方向'方向移动一小步。最终,我们可以加一些带$\sigma_t$系数的额外噪声。这是论文中与上述操作相关的章节内容: + +![Screenshot from 2023-01-28 10-04-22.png](data:image/png;base64,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+ +好,我们有了在可控量度噪声下,从$x_t$ 移动到 $x_{t-1}$的公式。今天我们所说案例是不需要再额外添加噪声的 - 即完全确定的DDIM采样。我们来看看这些是如何用代码表达的。 + + +```python +# Sample function (regular DDIM) +@torch.no_grad() +def sample(prompt, start_step=0, start_latents=None, + guidance_scale=3.5, num_inference_steps=30, + num_images_per_prompt=1, do_classifier_free_guidance=True, + negative_prompt='', device=device): + + # Encode prompt + text_embeddings = pipe._encode_prompt( + prompt, device, num_images_per_prompt, do_classifier_free_guidance, negative_prompt + ) + + # Set num inference steps + pipe.scheduler.set_timesteps(num_inference_steps, device=device) + + # Create a random starting point if we don't have one already + if start_latents is None: + start_latents = torch.randn(1, 4, 64, 64, device=device) + start_latents *= pipe.scheduler.init_noise_sigma + + latents = start_latents.clone() + + for i in tqdm(range(start_step, num_inference_steps)): + + t = pipe.scheduler.timesteps[i] + + # expand the latents if we are doing classifier free guidance + latent_model_input = torch.cat([latents] * 2) if do_classifier_free_guidance else latents + latent_model_input = pipe.scheduler.scale_model_input(latent_model_input, t) + + # predict the noise residual + noise_pred = pipe.unet(latent_model_input, t, encoder_hidden_states=text_embeddings).sample + + # perform guidance + if do_classifier_free_guidance: + noise_pred_uncond, noise_pred_text = noise_pred.chunk(2) + noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_text - noise_pred_uncond) + + + # Normally we'd rely on the scheduler to handle the update step: + # latents = pipe.scheduler.step(noise_pred, t, latents).prev_sample + + # Instead, let's do it ourselves: + prev_t = max(1, t.item() - (1000//num_inference_steps)) # t-1 + alpha_t = pipe.scheduler.alphas_cumprod[t.item()] + alpha_t_prev = pipe.scheduler.alphas_cumprod[prev_t] + predicted_x0 = (latents - (1-alpha_t).sqrt()*noise_pred) / alpha_t.sqrt() + direction_pointing_to_xt = (1-alpha_t_prev).sqrt()*noise_pred + latents = alpha_t_prev.sqrt()*predicted_x0 + direction_pointing_to_xt + + # Post-processing + images = pipe.decode_latents(latents) + images = pipe.numpy_to_pil(images) + + return images +``` + + +```python +# Test our sampling function by generating an image +sample('Watercolor painting of a beach sunset', negative_prompt=negative_prompt, num_inference_steps=50)[0].resize((256, 256)) +``` + +看看你是否能把这些代码和论文中的公式对应起来。注意$\sigma$=0是因为我们只注意 无-额外-噪声 的场景,所以我们略去了公式中的那部分。 + +## 反转 + +反转的目标就是'颠倒'取样的过程。我们想最终得到一个带噪的隐式(latent),如果把它作为我们正常取样过程的起始点,结果将生成一副原图像。 + +这里我们先加载一个原始图像,当然你也可以生成一副图像来代替。 + + +```python +# https://www.pexels.com/photo/a-beagle-on-green-grass-field-8306128/ +input_image = load_image('https://images.pexels.com/photos/8306128/pexels-photo-8306128.jpeg', size=(512, 512)) +input_image +``` + +我们可以用包含随意分类指引(classifier-free-guidance)的prompt来做反转操作,输入一个图片的描述: + + +```python +input_image_prompt = "Photograph of a puppy on the grass" +``` + +接下来我们来把这个PIL图像变成一些列隐式,它们会被用来当作反转的起点: + + +```python +# encode with VAE +with torch.no_grad(): latent = pipe.vae.encode(tfms.functional.to_tensor(input_image).unsqueeze(0).to(device)*2-1) +l = 0.18215 * latent.latent_dist.sample() +``` + +好了,到有趣的部分了。这个函数看起来和上面的取样函数很像,但我们在timesteps上是在向相反的方向移动,从t=0开始,向越来越多的噪声前进。代替更新隐式时噪声会越来越少,我们估计所预测出的噪声,用它来撤回一步更新操作,把它们从t移动到t+1。 + + +```python +## Inversion +@torch.no_grad() +def invert(start_latents, prompt, guidance_scale=3.5, num_inference_steps=80, + num_images_per_prompt=1, do_classifier_free_guidance=True, + negative_prompt='', device=device): + + # Encode prompt + text_embeddings = pipe._encode_prompt( + prompt, device, num_images_per_prompt, do_classifier_free_guidance, negative_prompt + ) + + # latents are now the specified start latents + latents = start_latents.clone() + + # We'll keep a list of the inverted latents as the process goes on + intermediate_latents = [] + + # Set num inference steps + pipe.scheduler.set_timesteps(num_inference_steps, device=device) + + # Reversed timesteps <<<<<<<<<<<<<<<<<<<< + timesteps = reversed(pipe.scheduler.timesteps) + + for i in tqdm(range(1, num_inference_steps), total=num_inference_steps-1): + + # We'll skip the final iteration + if i >= num_inference_steps - 1: continue + + t = timesteps[i] + + # expand the latents if we are doing classifier free guidance + latent_model_input = torch.cat([latents] * 2) if do_classifier_free_guidance else latents + latent_model_input = pipe.scheduler.scale_model_input(latent_model_input, t) + + # predict the noise residual + noise_pred = pipe.unet(latent_model_input, t, encoder_hidden_states=text_embeddings).sample + + # perform guidance + if do_classifier_free_guidance: + noise_pred_uncond, noise_pred_text = noise_pred.chunk(2) + noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_text - noise_pred_uncond) + + current_t = max(0, t.item() - (1000//num_inference_steps))#t + next_t = t # min(999, t.item() + (1000//num_inference_steps)) # t+1 + alpha_t = pipe.scheduler.alphas_cumprod[current_t] + alpha_t_next = pipe.scheduler.alphas_cumprod[next_t] + + # Inverted update step (re-arranging the update step to get x(t) (new latents) as a function of x(t-1) (current latents) + latents = (latents - (1-alpha_t).sqrt()*noise_pred)*(alpha_t_next.sqrt()/alpha_t.sqrt()) + (1-alpha_t_next).sqrt()*noise_pred + + + # Store + intermediate_latents.append(latents) + + return torch.cat(intermediate_latents) + +``` + +把它在小狗图片的隐式表达上运行,我们可以在反转的中间过程得到一系列的隐式: + + +```python +inverted_latents = invert(l, input_image_prompt,num_inference_steps=50) +inverted_latents.shape +``` + + + 0%| | 0/49 [00:00 + + Your browser does not support the audio element. + + + + +这里,`rate`参数明确了音频的 _采样率_ ;过会儿我们会再深入了解它。同时你也会注意到pipeline也返回了几样其他的东西。这发生了什么?我们来仔细看看这两个输出。 + +第一项是一个数据数组,代表生成的音频: + + +```python +# The audio array: +output.audios[0].shape +``` + + + + + (1, 130560) + + + +第二项看起来像是灰度图: + + +```python +# The output image (spectrogram): +output.images[0].size +``` + + + + + (256, 256) + + + +这给了我们一个提示,关于这个pipeline是如何工作的。音频不是直接被扩散模型生成 - 而是,这个pipeline有着与在第一单元看到的无条件图像生成pipelines类似的2D Unet结构 [Unit 1](https://github.com/huggingface/diffusion-models-class/tree/main/unit1) 用它来生成频谱,之后再在后处理中把它变化为最终的音频。 + +此pipe中有额外的组件来处理这个变化,我们可以通过`pipe.mel`来进行: + + +```python +pipe.mel +``` + + + + + Mel { + "_class_name": "Mel", + "_diffusers_version": "0.12.0.dev0", + "hop_length": 512, + "n_fft": 2048, + "n_iter": 32, + "sample_rate": 22050, + "top_db": 80, + "x_res": 256, + "y_res": 256 + } + + + +## 音频到频谱的转换 + +音频的'波形'从时间上表现出了源音频 - 比如,这可能是接收自麦克风的电信号。从这种'时域'的表达方式上做处理会有些棘手,所以有种更普遍的做法把它转换成其他形式,通常把这叫做频谱。频谱直接展示出在不同频率(y轴)与时间(x轴)上的剧烈程度。 + + +```python +# Calculate and show a spectrogram for our generated audio sample using torchaudio +spec_transform = AT.Spectrogram(power=2) +spectrogram = spec_transform(torch.tensor(output.audios[0])) +print(spectrogram.min(), spectrogram.max()) +log_spectrogram = spectrogram.log() +plt.imshow(log_spectrogram[0], cmap='gray'); +``` + + tensor(0.) tensor(6.0842) + + + + +![png](02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_17_1.png) + + + +我们刚刚做好的这个频谱取值范围在0.0000000000001到1之间,其中大部分内容都接近取值下限。这对于可视化与建模并不理想 - 实际上我们需要对这些值取log来得到一个可以看到更多细节的灰度图。同样也因此,我们特别使用一种专门的梅尔频谱(Mel spectrogram),这是一种通过对不同频率成分做一些变化,专门设计的一种符合人耳感知特性而利于提取重要信息的方式。 + +![torchaudio docs diagram](https://download.pytorch.org/torchaudio/tutorial-assets/torchaudio_feature_extractions.png) +_一些来自 [torchaudio docs](https://pytorch.org/audio/stable/transforms.html)的音频转换方法_ + +幸运的是,我们并不需要太过于担心这些变换方法 - pipeline中的`mel`功能会为我们处理这些细节。这样操作,我们就能把频谱图像转换成音频: + + +```python +a = pipe.mel.image_to_audio(output.images[0]) +a.shape +``` + + + + + (130560,) + + + +我们可以先读出源音频数据然后调用 `audio_slice_to_image()`函数来把音频数组数据转化为频谱图片。更长的片段会被自动切片为能够正常输出 256x256 频谱图片的长度。 + + +```python +pipe.mel.load_audio(raw_audio=a) +im = pipe.mel.audio_slice_to_image(0) +im +``` + + + + + +![png](02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_23_0.png) + + + + +音频被表现为一串很长的数字数组。要把它播放出来的话,我们还需要一个关键信息:采样率。我们要用到多少个采样点(单个的数值),才能够播放出单位秒的音频呢? + +我们可以在pipeline中这样来看使用的采样率: + + +```python +sample_rate_pipeline = pipe.mel.get_sample_rate() +sample_rate_pipeline +``` + + + + + 22050 + + + +如果我们故意把采样率设置错误,可以得到一个可能被加速或慢放的音频: + + +```python +display(Audio(output.audios[0], rate=44100)) # 2x speed +``` + + + + + + + +## 微调pipeline + +现在我们已经大致理解了这个pipeline是怎么工作的,现在来在一些新音频数据上对它进行微调! + +这个数据集是不同类别的音频片段集合,我们可以从hub上这样加载它: + + +```python +from datasets import load_dataset +dataset = load_dataset('lewtun/music_genres', split='train') +dataset +``` + + Using custom data configuration lewtun--music_genres-2cfa9201f94788d8 + Found cached dataset parquet (/home/ubuntu/.cache/huggingface/datasets/lewtun___parquet/lewtun--music_genres-2cfa9201f94788d8/0.0.0/2a3b91fbd88a2c90d1dbbb32b460cf621d31bd5b05b934492fdef7d8d6f236ec) + + + + + + Dataset({ + features: ['audio', 'song_id', 'genre_id', 'genre'], + num_rows: 19909 + }) + + + +你可以使用下面的代码来看看在数据集中各类别样本的占比: + + +```python +for g in list(set(dataset['genre'])): + print(g, sum(x==g for x in dataset['genre'])) +``` + + Pop 945 + Blues 58 + Punk 2582 + Old-Time / Historic 408 + Experimental 1800 + Folk 1214 + Electronic 3071 + Spoken 94 + Classical 495 + Country 142 + Instrumental 1044 + Chiptune / Glitch 1181 + International 814 + Ambient Electronic 796 + Jazz 306 + Soul-RnB 94 + Hip-Hop 1757 + Easy Listening 13 + Rock 3095 + + +这个数据集把音频存储为数组: + + +```python +audio_array = dataset[0]['audio']['array'] +sample_rate_dataset = dataset[0]['audio']['sampling_rate'] +print('Audio array shape:', audio_array.shape) +print('Sample rate:', sample_rate_dataset) +display(Audio(audio_array, rate=sample_rate_dataset)) +``` + + Audio array shape: (1323119,) + Sample rate: 44100 + + + + + + + + +注意这条音频的采样率会更高 - 如果我们想用手头的这个pipeline,需要对它'重采样'来匹配。这个片段也比pipeline所预设的长度更长。幸运的是,当我们使用`pipe.mel`在加载音频时,会自动把它切片成更短的片区。 + + +```python +a = dataset[0]['audio']['array'] # Get the audio array +pipe.mel.load_audio(raw_audio=a) # Load it with pipe.mel +pipe.mel.audio_slice_to_image(0) # View the first 'slice' as a spectrogram +``` + + + + + +![png](02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_37_0.png) + + + + +我们要记得去调整采样率,因为此数据集的数据在每秒中有着多两倍的数据点。 + + +```python +sample_rate_dataset = dataset[0]['audio']['sampling_rate'] +sample_rate_dataset +``` + + + + + 44100 + + + +这里我们用torchaudio's transforms(导入为AT)来做音频的重采样,pipe中的`mel`把音频转换为图像,torchvision's transforms(导入为IT)来把图片转换为tensors。这个函数可以把音频片段转换为频谱tensor供训练使用: + + +```python +resampler = AT.Resample(sample_rate_dataset, sample_rate_pipeline, dtype=torch.float32) +to_t = IT.ToTensor() + +def to_image(audio_array): + audio_tensor = torch.tensor(audio_array).to(torch.float32) + audio_tensor = resampler(audio_tensor) + pipe.mel.load_audio(raw_audio=np.array(audio_tensor)) + num_slices = pipe.mel.get_number_of_slices() + slice_idx = random.randint(0, num_slices-1) # Pic a random slice each time (excluding the last short slice) + im = pipe.mel.audio_slice_to_image(slice_idx) + return im +``` + +来使用我们的`to_image()`函数来组成我们特定的整理函数(collate function)来把数据集转换到dataloader中来训练模型。整理函数定义了如何把一批来自数据集的样例变换为最终训练用数据。在这个例子中我们把每个音频转换为频谱图像再把他们的tensors堆叠起来: + + +```python +def collate_fn(examples): + # to image -> to tensor -> rescale to (-1, 1) -> stack into batch + audio_ims = [to_t(to_image(x['audio']['array']))*2-1 for x in examples] + return torch.stack(audio_ims) + +# Create a dataset with only the 'Chiptune / Glitch' genre of songs +batch_size=4 # 4 on colab, 12 on A100 +chosen_genre = 'Electronic' # <<< Try training on different genres <<< +indexes = [i for i, g in enumerate(dataset['genre']) if g == chosen_genre] +filtered_dataset = dataset.select(indexes) +dl = torch.utils.data.DataLoader(filtered_dataset.shuffle(), batch_size=batch_size, collate_fn=collate_fn, shuffle=True) +batch = next(iter(dl)) +print(batch.shape) +``` + + torch.Size([4, 1, 256, 256]) + + +**留心: 你可能要用一个更小的batchsize(比如4)除非你有足够的显存可用** + +## 训练循环 + +这是一个在dataloader中读取数据的简洁训练循环,用几个周期来微调pipeline的UNet网络。你可以跳过此块,直接使用下一块代码来加载pipeline。 + + +```python +epochs = 3 +lr = 1e-4 + +pipe.unet.train() +pipe.scheduler.set_timesteps(1000) +optimizer = torch.optim.AdamW(pipe.unet.parameters(), lr=lr) + +for epoch in range(epochs): + for step, batch in tqdm(enumerate(dl), total=len(dl)): + + # Prepare the input images + clean_images = batch.to(device) + bs = clean_images.shape[0] + + # Sample a random timestep for each image + timesteps = torch.randint( + 0, pipe.scheduler.num_train_timesteps, (bs,), device=clean_images.device + ).long() + + # Add noise to the clean images according to the noise magnitude at each timestep + noise = torch.randn(clean_images.shape).to(clean_images.device) + noisy_images = pipe.scheduler.add_noise(clean_images, noise, timesteps) + + # Get the model prediction + noise_pred = pipe.unet(noisy_images, timesteps, return_dict=False)[0] + + # Calculate the loss + loss = F.mse_loss(noise_pred, noise) + loss.backward(loss) + + # Update the model parameters with the optimizer + optimizer.step() + optimizer.zero_grad() +``` + + +```python +# OR: Load the version I trained earlier: +pipe = DiffusionPipeline.from_pretrained("johnowhitaker/Electronic_test").to(device) +``` + + + Downloading: 0%| | 0.00/282 [00:00 + + Your browser does not support the audio element. + + + + + +```python +# Make a longer sample by passing in a starting noise tensor with a different shape +noise = torch.randn(1, 1, pipe.unet.sample_size[0],pipe.unet.sample_size[1]*4).to(device) +output = pipe(noise=noise) +display(output.images[0]) +display(Audio(output.audios[0], rate=22050)) +``` + + + 0%| | 0/1000 [00:00 + + Your browser does not support the audio element. + + + + +这个输出听起来不是最美妙的,但这是一个开始 :)探索一下调整学习率和迭代周期,并在Discord上分享你的最佳结果,我们就可以来一起进步了! + +一些需要考虑的事情 +- 我们使用的是256像素点的方形频谱图片,这会限制住我们的batchsize。你能够从128x128的频谱中恢复出质量足够好的音频吗? +- 为了替代随机图像增强,我们每次挑选不同的音频片段,但这种做法在训练迭代的后期是否可以用其他增强方式再优化一下? +- 我们有什么其他办法可以用它来生成更长的音频?也许你可以先生成开头的5s音频然后再用类似图像修复的思路接着卡开头片段来继续生成后续内容... +- 扩散模型生成的内容与图像到图像的生成有什么相同之处? + +## Push到Hub + +当你对你的模型足够满意了,你就可以把它保存下来并上传到hub上给他人来共享: + + +```python +from huggingface_hub import get_full_repo_name, HfApi, create_repo, ModelCard +``` + + +```python +# Pick a name for the model +model_name = "audio-diffusion-electronic" +hub_model_id = get_full_repo_name(model_name) +``` + + +```python +# Save the pipeline locally +pipe.save_pretrained(model_name) +``` + + +```python +# Inspect the folder contents +!ls {model_name} +``` + + mel model_index.json scheduler unet + + + +```python +# Create a repository +create_repo(hub_model_id) +``` + + + + + 'https://huggingface.co/johnowhitaker/Electronic_test' + + + + +```python +# Upload the files +api = HfApi() +api.upload_folder( + folder_path=f"{model_name}/scheduler", path_in_repo="scheduler", repo_id=hub_model_id +) +api.upload_folder( + folder_path=f"{model_name}/mel", path_in_repo="mel", repo_id=hub_model_id +) +api.upload_folder(folder_path=f"{model_name}/unet", path_in_repo="unet", repo_id=hub_model_id) +api.upload_file( + path_or_fileobj=f"{model_name}/model_index.json", + path_in_repo="model_index.json", + repo_id=hub_model_id, +) +``` + + + + + 'https://huggingface.co/johnowhitaker/Electronic_test/blob/main/model_index.json' + + + + +```python +# Push a model card +content = f""" +--- +license: mit +tags: +- pytorch +- diffusers +- unconditional-audio-generation +- diffusion-models-class +--- + +# Model Card for Unit 4 of the [Diffusion Models Class 🧨](https://github.com/huggingface/diffusion-models-class) + +This model is a diffusion model for unconditional audio generation of music in the genre {chosen_genre} + +## Usage + +```python +from IPython.display import Audio +from diffusers import DiffusionPipeline + +pipe = DiffusionPipeline.from_pretrained("{hub_model_id}") +output = pipe() +display(output.images[0]) +display(Audio(output.audios[0], rate=pipe.mel.get_sample_rate())) +``` +""" + +card = ModelCard(content) +card.push_to_hub(hub_model_id) +``` + + + + + 'https://huggingface.co/johnowhitaker/Electronic_test/blob/main/README.md' + + + +## 总结 + +希望这片笔记让你浅尝到音频生成的潜力。请再留意下此单元在介绍中的一些参考链接,去看一些更酷炫的方法和它们所创造的惊艳内容! diff --git a/markdown/unit4/02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_17_1.png b/markdown/unit4/02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_17_1.png new file mode 100644 index 0000000000000000000000000000000000000000..b1db6df1bbe1e83d6b0518ed5253e8857650e00b --- /dev/null +++ b/markdown/unit4/02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_17_1.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:d6079cab3bab81154a55724d67efbfaca32338a9482b02b9481017846180345b +size 40006 diff --git a/markdown/unit4/02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_23_0.png b/markdown/unit4/02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_23_0.png new file mode 100644 index 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a/markdown/unit4/02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_8_1.png b/markdown/unit4/02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_8_1.png new file mode 100644 index 0000000000000000000000000000000000000000..18033ea9795137357ea1a25a64f398c95d8f73e9 --- /dev/null +++ b/markdown/unit4/02_diffusion_for_audio_CN_files/02_diffusion_for_audio_CN_8_1.png @@ -0,0 +1,3 @@ +version https://git-lfs.github.com/spec/v1 +oid sha256:2babaa4b3f5d633ada48d83890881e1092044d70f51fad82208977733ad475a2 +size 43502 diff --git a/markdown/unit4/README_CN.md b/markdown/unit4/README_CN.md new file mode 100644 index 0000000000000000000000000000000000000000..2c1fe9222207a66c95cfb701af737f8158d21fc6 --- /dev/null +++ b/markdown/unit4/README_CN.md @@ -0,0 +1,167 @@ +# Unit 4: 深入研究扩散模型 + +欢迎来到 Hugging Face 扩散模型课程的第四单元!在这个单元中,我们将探讨最新研究中出现的扩散模型的许多改进和扩展。它将比以往的单元代码更少,旨在为您提供进一步研究的起点。 + +## 开始本单元 :rocket: + +以下是本单元的学习步骤: + +- 请确保你已经 [注册了该课程](https://huggingface.us17.list-manage.com/subscribe?u=7f57e683fa28b51bfc493d048&id=ef963b4162) 以便在课程中添加其他单元时通知您 +- 阅读下面的材料,以了解本单元中涉及的不同主题的梗概 +- 通过链接的视频和资源深入了解任何您感兴趣的主题 +- 浏览演示笔记本,然后阅读“下一步”部分以获取一些项目建议 + +:loudspeaker: 别忘了加入我们的 [Discord频道](https://huggingface.co/join/discord), 在这里,您可以讨论课程内容,并在`#diffusion-models-class` 频道中分享您的作品! + +## Table of Contents + +- [Unit 4: 深入研究扩散模型](#unit-4-going-further-with-diffusion-models) + - [开始本单元 :rocket:](#start-this-unit-rocket) + - [课程目录](#table-of-contents) + - [通过蒸馏进行快速采样](#faster-sampling-via-distillation) + - [训练改进](#training-improvements) + - [对生成与编辑的更多控制](#more-control-for-generation-and-editing) + - [视频](#video) + - [音频](#audio) + - [新的体系结构和方法 - 走向“迭代优化”](#new-architectures-and-approaches---towards-iterative-refinement) + - [动手笔记本](#hands-on-notebooks) + - [下一步?](#where-next) + + +## 通过蒸馏进行快速采样 + +渐进蒸馏是一种采用现有扩散模型并使用它来训练需要更少推理步骤的模型的新版本的技术。“学生”模型初始化自“教师”模型的权重。在训练过程中,教师模型执行两个采样步骤,学生模型尝试在一个步骤中匹配结果预测。这个过程可以重复多次,上一次迭代的学生模型成为下一阶段的教师模型。结果是,这个模型可以用比原来的教师模型少得多的步骤(通常是4或8步)生成较好的样本。核心机制如下图所示,图片来源于[这篇论文](http://arxiv.org/abs/2202.00512): + +![image](https://user-images.githubusercontent.com/6575163/211016659-7dac24a5-37e2-45f9-aba8-0c573937e7fb.png) + +_渐进蒸馏图示 (来源于[该篇论文](http://arxiv.org/abs/2202.00512))_ + +使用现有模型“教授”新模型的想法可以扩展到创建指导模型,其中教师模型使用无分类器指导技术,学生模型必须学会在指定目标指导尺度的额外输入的基础上,在单个步骤中产生等价的输出。[这个视频](https://www.youtube.com/watch?v=ZXuK6IRJlnk) 对该方法做了一个概述。 + +NB: Stable Diffusion的蒸馏版将很快发布。 + +主要文献: +- [Progressive Distillation For Fast Sampling Of Diffusion Models](http://arxiv.org/abs/2202.00512) +- [On Distillation Of Guided Diffusion Models](http://arxiv.org/abs/2210.03142) + +## 训练改进 + +研究者们现在已经开发了一些额外的技巧来改进扩散模型的训练过程。在本节中,我们试图从最近的论文中寻找一些相关的核心理念。更多关于改进方法的研究论文也是不断涌现,因此,如果你看到一篇你觉得应该添加在这里的论文,请联系我们! + +![image](https://user-images.githubusercontent.com/6575163/211021220-e87ca296-cf15-4262-9359-7aeffeecbaae.png) +_图像2来自于 [ERNIE-ViLG 2.0 paper](http://arxiv.org/abs/2210.15257)_ + +关键的训练改进: +- 调整噪声计划、损失加权和采样轨迹,以获得更有效的训练。这里是一篇探讨这些设计选择的优秀论文 [Elucidating the Design Space of Diffusion-Based Generative Models](http://arxiv.org/abs/2206.00364) by Karras et al. +- 在不同的长宽比上进行训练。这一方法被描述在[课程启动活动提到的这个视频中](https://www.youtube.com/watch?v=g6tIUrMvOec) +- 级联扩散模型,首先训练一个低分辨率模型,然后训练一个或多个超分辨率模型。这一方法被广泛运用于DALLE-2,Imagen等高分辨率图像生成模型中。 +- Better conditioning, incorporating rich text embeddings ([Imagen](https://arxiv.org/abs/2205.11487) uses a large language model called T5) or multiple types of conditioning ([eDiffi](http://arxiv.org/abs/2211.01324)) +- 更好的调节、结合富文本嵌入 ([Imagen](https://arxiv.org/abs/2205.11487) 使用了一个名为T-5的大语言模型) 或进行多种类型的调节 ([eDiffi](http://arxiv.org/abs/2211.01324)) +- “知识增强” - 将预先训练的图像描述和物体检测模型纳入训练过程,以创建更有信息的描述,并产生更好的表现 ([ERNIE-ViLG 2.0](http://arxiv.org/abs/2210.15257)) +- “复合降噪专家” (MoDE) - 训练模型的不同变体(“专家”)以适应不同的噪声水平,如上图所示 [ERNIE-ViLG 2.0 paper](http://arxiv.org/abs/2210.15257). + +主要文献: +- [Elucidating the Design Space of Diffusion-Based Generative Models](http://arxiv.org/abs/2206.00364) +- [eDiffi: Text-to-Image Diffusion Models with an Ensemble of Expert Denoisers](http://arxiv.org/abs/2211.01324) +- [ERNIE-ViLG 2.0: Improving Text-to-Image Diffusion Model with Knowledge-Enhanced Mixture-of-Denoising-Experts](http://arxiv.org/abs/2210.15257) +- [Imagen - Photorealistic Text-to-Image Diffusion Models with Deep Language Understanding](https://arxiv.org/abs/2205.11487) ([demo site](https://imagen.research.google/)) + +## 对生成与编辑的更多控制 + +除了训练方面的改进,在采样和推断阶段也有一些创新方法。这其中有许多甚至可以为现有扩散模型添加新的功能。 + +![image](https://user-images.githubusercontent.com/6575163/212529129-3de41cf4-6f70-4607-8448-e9bbe9d190cf.png) +_由'paint-with-words'生成的样本 ([eDiffi](http://arxiv.org/abs/2211.01324))_ + +这个视频 ['使用扩散模型编辑图片'](https://www.youtube.com/watch?v=zcG7tG3xS3s) 概述了如何使用的不同的方法来通过应用扩散模型对已有的图片进行编辑。可用的技术主要分为四个主要类别: +1) 添加噪声,然后用一个新的提示(prompt)来进行去噪. 这就是 'img2img ' 管道背后的思想,已经在各种论文中得到了扩展: +- [SDEdit](https://sde-image-editing.github.io/) and [MagicMix](https://magicmix.github.io/) 这两篇论文都是建立在这一理念的基础上的 +- DDIM 反演 (TODO link tutorial)使用模型来“反转”采样轨迹来取代添加随机噪声, 从而提供了更多的控制 +- [Null-text Inversion](https://null-text-inversion.github.io/) 通过在每一步中优化用于无分类器引导的无条件文本嵌入,允许极高质量的基于文本的图像编辑,极大地增强了这种方法的性能。 + +2) 扩展了(1)中的思想,但使用蒙版来控制效果的应用位置 +- [Blended Diffusion](https://omriavrahami.com/blended-diffusion-page/) 介绍了基础的理念 +- [这个 demo](https://huggingface.co/spaces/nielsr/text-based-inpainting) 使用现有的分割模型(CLIPSeg)来创建基于文本描述的掩码 +- [DiffEdit](https://arxiv.org/abs/2210.11427) 是一篇展示了如何使用扩散模型本身来生成适当的掩码,以根据文本编辑图像的优秀论文。 +- [SmartBrush: Text and Shape Guided Object Inpainting with Diffusion Model](https://arxiv.org/abs/2212.05034) 微调扩散模型以获得更准确的掩模引导图像修补。 + +3) 交叉注意力控制:利用扩散模型中的交叉注意力机制控制编辑的空间位置,实现更细粒度的控制。 +- [Prompt-to-Prompt Image Editing with Cross Attention Control](https://arxiv.org/abs/2208.01626) 是介绍这一想法的关键论文,并且该技术[已经应用于Stable Diffusion](https://wandb.ai/wandb/cross-attention-control/reports/Improving-Generative-Images-with-Instructions-Prompt-to-Prompt-Image-Editing-with-Cross-Attention-Control--VmlldzoyNjk2MDAy) +- 这个想法也被用于 'paint-with-words'中 ([eDiffi](http://arxiv.org/abs/2211.01324)) + +4) 对单个图像进行微调(“过拟合”),然后使用微调模型进行图像生成。以下论文几乎在同一时间发表了非常类似的想法: +- [Imagic: Text-Based Real Image Editing with Diffusion Models](https://arxiv.org/abs/2210.09276) +- [UniTune: Text-Driven Image Editing by Fine Tuning an Image Generation Model on a Single Image +](https://arxiv.org/abs/2210.09477) + +值得注意的是,这篇论文 [InstructPix2Pix: Learning to Follow Image Editing Instructions](https://arxiv.org/abs/2211.09800) 使用了上面描述的一些图像编辑技术来构建一个图像对的合成数据集以及图像编辑指令(由GPT3.5生成),训练生成了一个能够基于自然语言指令编辑图像的新模型。 + + +## 视频 + +![image](https://user-images.githubusercontent.com/6575163/213657523-be40178a-4357-410b-89e3-a4cbd8528900.png) +_Still frames from [样本视频通过Imagen Video生成](https://imagen.research.google/video/)_ + +视频可以表示为一组图像的序列,而扩散模型的核心思想可以被应用于这些序列。最近的工作主要集中在寻找合适的架构(例如“3D unet”,它可以对整个序列进行操作)并有效地处理视频数据。由于高帧率视频比静止图像涉及更多的数据,目前的方法倾向于首先生成低分辨率和低帧率视频,然后应用空间和时间超分辨率方法来生成最终的高质量视频输出。 + +主要文献: +- [Video Diffusion Models](https://video-diffusion.github.io/) +- [IMAGEN VIDEO: HIGH DEFINITION VIDEO GENERATION WITH DIFFUSION MODELS](https://imagen.research.google/video/paper.pdf) + +## 音频 + +![image](https://user-images.githubusercontent.com/6575163/213657272-a1b54017-216f-453b-9b28-97c6fef21f54.png) + +_用Riffusion生成的一幅光谱图 ([图片来源](https://www.riffusion.com/about))_ + +虽然已经有一些直接使用扩散模型生成音频的工作(e.g. [DiffWave](https://arxiv.org/abs/2009.09761)),但迄今为止最成功的方法还是将音频信号转换为一种称为频谱图的东西,这种方法有效地将音频“编码”为2D“图像”,然后可以用于训练我们用来做图像生成的扩散模型。之后就可以使用现有方法将生成的频谱图转换为音频。最近发布的Riffusion模型就是基于这样的设计思路。该模型通过微调Stable Diffusion模型来基于文字生成频谱图 - [点击这里进行尝试](https://www.riffusion.com/)。 + +音频生成领域发展非常迅速。至少有5个新的进展在过去的一周(在撰写本文时)被发布了。在下面的列表中,我们用星号将他们标了出来: + +主要文献: +- [DiffWave: A Versatile Diffusion Model for Audio Synthesis](https://arxiv.org/abs/2009.09761) +- ['Riffusion'](https://www.riffusion.com/about) (and [code](https://github.com/riffusion/riffusion)) +- *[MusicLM](https://google-research.github.io/seanet/musiclm/examples/) 通过谷歌从文本生成一致的音频,并可以调节哼唱或吹口哨的旋律 +- *[RAVE2](https://github.com/acids-ircam/RAVE) - 一个新版本的变分自动编码器,可以被用在latent diffusion音频任务上。 这个新结构将被用在下面这篇即将发布的模型中 *[AudioLDM](https://twitter.com/LiuHaohe/status/1619119637660327936?s=20&t=jMkPWBFuAH19HI9m5Sklmg) +- *[Noise2Music](https://noise2music.github.io/) - 该扩散模型可以基于文本描述来生成一段高质量的30秒音频片段 +- *[Make-An-Audio: Text-To-Audio Generation with Prompt-Enhanced Diffusion Models](https://text-to-audio.github.io/) - 该扩散模型可以基于文本描述来生成不同的声音 +- *[Moûsai: Text-to-Music Generation with Long-Context Latent Diffusion](https://arxiv.org/abs/2301.11757) + +## 新的体系结构和方法 - 走向“迭代优化” + +![image](https://user-images.githubusercontent.com/6575163/213731066-0fbe38a7-233f-42be-99fc-38cea889c86b.png) + +_图片1来自 [Cold Diffusion](http://arxiv.org/abs/2208.09392) paper_ + +我们正在慢慢地超越最初的“扩散”模型的狭义定义,并向更一般的、执行**迭代优化**的一类模型前进。这其中某种形式的破坏(例如在正向扩散过程中添加高斯噪声)被逐渐逆转以生成样本。这篇有关“冷扩散”的论文证明了许多其他类型的退化过程可以迭代地被“撤销”以生成图像(如上所示的示例)。同时最近基于transformer的方法也证明了符记替换(token replacement)或遮蔽(masking)作为噪声策略的有效性。 + +![image](https://user-images.githubusercontent.com/6575163/213731351-7fd6c98c-6ba6-4bd9-a898-230002fc334f.png) + +_Pipeline from [MaskGIT](http://arxiv.org/abs/2202.04200)_ + +目前许多扩散模型的核心UNet架构也正在被不同的替代方案所取代,最显著的是各种基于transformer的架构。在 [Scalable Diffusion Models with Transformers (DiT)](https://www.wpeebles.com/DiT)中,transformer结构被用来替换了一个标准扩散模型方法中的UNet结构, 并获得了相当不错的成果。 [Recurrent Interface Networks](https://arxiv.org/pdf/2212.11972.pdf) 应用一种新的基于transformer的架构和训练策略,以追求额外的效率。[MaskGIT](http://arxiv.org/abs/2202.04200) 和 [MUSE](http://arxiv.org/abs/2301.00704) 使用 transformer 模型来处理图像的标记化表示。 而[Paella](https://arxiv.org/abs/2211.07292v1)这篇文章也表示,UNet结构同样可以在这些token-based的设计中成功发挥作用。 + +随着每一篇新论文的发表,更有效的方法正在陆续被开发出来。我们可能还需要一段时间才能看到这种迭代细化任务的巅峰性能。我们十分期待还有更多的东西被探索和发掘! + +主要文献 +- [Cold Diffusion: Inverting Arbitrary Image Transforms Without Noise](http://arxiv.org/abs/2208.09392) +- [Scalable Diffusion Models with Transformers (DiT)](https://www.wpeebles.com/DiT) +- [MaskGIT: Masked Generative Image Transformer](http://arxiv.org/abs/2202.04200) +- [Muse: Text-To-Image Generation via Masked Generative Transformers](http://arxiv.org/abs/2301.00704) +- [Fast Text-Conditional Discrete Denoising on Vector-Quantized Latent Spaces (Paella)](https://arxiv.org/abs/2211.07292v1) +- [Recurrent Interface Networks](https://arxiv.org/pdf/2212.11972.pdf) - 一种很有前途的新架构,可以在不依赖latent diffusion或超分辨率模型的情况下生成高分辨率图像。另请参阅 [simple diffusion: End-to-end diffusion for high-resolution images](https://arxiv.org/abs/2301.11093) 该论文强调了噪声表(noise schedule)在高分辨率训练中的重要性。 + +## 动手笔记本 + +| 章节 | Colab | Kaggle | Gradient | Studio Lab | +|:--------------------------------------------|:----------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:---------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:---------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------|:-------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------| +| DDIM Inversion | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/huggingface/diffusion-models-class/blob/main/unit4/01_ddim_inversion.ipynb) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/huggingface/diffusion-models-class/blob/main/unit4/01_ddim_inversion.ipynb) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/huggingface/diffusion-models-class/blob/main/unit4/01_ddim_inversion.ipynb) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/huggingface/diffusion-models-class/blob/main/unit4/01_ddim_inversion.ipynb) | +| Diffusion for Audio | [![Open In Colab](https://colab.research.google.com/assets/colab-badge.svg)](https://colab.research.google.com/github/huggingface/diffusion-models-class/blob/main/unit4/02_diffusion_for_audio.ipynb) | [![Kaggle](https://kaggle.com/static/images/open-in-kaggle.svg)](https://kaggle.com/kernels/welcome?src=https://github.com/huggingface/diffusion-models-class/blob/main/unit4/02_diffusion_for_audio.ipynb) | [![Gradient](https://assets.paperspace.io/img/gradient-badge.svg)](https://console.paperspace.com/github/huggingface/diffusion-models-class/blob/main/unit4/02_diffusion_for_audio.ipynb) | [![Open In SageMaker Studio Lab](https://studiolab.sagemaker.aws/studiolab.svg)](https://studiolab.sagemaker.aws/import/github/huggingface/diffusion-models-class/blob/main/unit4/02_diffusion_for_audio.ipynb) | + +在本单元中,我们已经讨论了很多不同的想法,其中许多值得在未来的后续课程中进行更详细的学习。现在,你可以通过我们准备的动手笔记本来学习其中的两个主题。 +- **DDIM Inversion** 展示了如何使用一种被称为“反转”的技术来使用已有的扩散模型编辑图像 +- **Diffusion for Audio** 介绍了频谱图的思想,并展示了如何对特定音乐风格的音频扩散模型进行微调。 + +## 下一步? + +这是本课程的最后一个单元,这意味着接下来要做什么取决于你! 请记得你永远都可以来Hugging Face [discord频道](https://huggingface.co/join/discord)上来询问问题或者聊聊你自己的project。 我们期待看到你的创作! 🤗