# Copyright 2022 Zhejiang University Team and The HuggingFace Team. All rights reserved. # # Licensed under the Apache License, Version 2.0 (the "License"); # you may not use this file except in compliance with the License. # You may obtain a copy of the License at # # http://www.apache.org/licenses/LICENSE-2.0 # # Unless required by applicable law or agreed to in writing, software # distributed under the License is distributed on an "AS IS" BASIS, # WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. # See the License for the specific language governing permissions and # limitations under the License. # DISCLAIMER: This file is strongly influenced by https://github.com/ermongroup/ddim import math from dataclasses import dataclass from typing import Optional, Tuple, Union import flax import jax import jax.numpy as jnp from ..configuration_utils import ConfigMixin, register_to_config from .scheduling_utils_flax import ( _FLAX_COMPATIBLE_STABLE_DIFFUSION_SCHEDULERS, FlaxSchedulerMixin, FlaxSchedulerOutput, broadcast_to_shape_from_left, ) def betas_for_alpha_bar(num_diffusion_timesteps: int, max_beta=0.999) -> jnp.ndarray: """ Create a beta schedule that discretizes the given alpha_t_bar function, which defines the cumulative product of (1-beta) over time from t = [0,1]. Contains a function alpha_bar that takes an argument t and transforms it to the cumulative product of (1-beta) up to that part of the diffusion process. Args: num_diffusion_timesteps (`int`): the number of betas to produce. max_beta (`float`): the maximum beta to use; use values lower than 1 to prevent singularities. Returns: betas (`jnp.ndarray`): the betas used by the scheduler to step the model outputs """ def alpha_bar(time_step): return math.cos((time_step + 0.008) / 1.008 * math.pi / 2) ** 2 betas = [] for i in range(num_diffusion_timesteps): t1 = i / num_diffusion_timesteps t2 = (i + 1) / num_diffusion_timesteps betas.append(min(1 - alpha_bar(t2) / alpha_bar(t1), max_beta)) return jnp.array(betas, dtype=jnp.float32) @flax.struct.dataclass class PNDMSchedulerState: # setable values _timesteps: jnp.ndarray num_inference_steps: Optional[int] = None prk_timesteps: Optional[jnp.ndarray] = None plms_timesteps: Optional[jnp.ndarray] = None timesteps: Optional[jnp.ndarray] = None # running values cur_model_output: Optional[jnp.ndarray] = None counter: int = 0 cur_sample: Optional[jnp.ndarray] = None ets: jnp.ndarray = jnp.array([]) @classmethod def create(cls, num_train_timesteps: int): return cls(_timesteps=jnp.arange(0, num_train_timesteps)[::-1]) @dataclass class FlaxPNDMSchedulerOutput(FlaxSchedulerOutput): state: PNDMSchedulerState class FlaxPNDMScheduler(FlaxSchedulerMixin, ConfigMixin): """ Pseudo numerical methods for diffusion models (PNDM) proposes using more advanced ODE integration techniques, namely Runge-Kutta method and a linear multi-step method. [`~ConfigMixin`] takes care of storing all config attributes that are passed in the scheduler's `__init__` function, such as `num_train_timesteps`. They can be accessed via `scheduler.config.num_train_timesteps`. [`SchedulerMixin`] provides general loading and saving functionality via the [`SchedulerMixin.save_pretrained`] and [`~SchedulerMixin.from_pretrained`] functions. For more details, see the original paper: https://arxiv.org/abs/2202.09778 Args: num_train_timesteps (`int`): number of diffusion steps used to train the model. beta_start (`float`): the starting `beta` value of inference. beta_end (`float`): the final `beta` value. beta_schedule (`str`): the beta schedule, a mapping from a beta range to a sequence of betas for stepping the model. Choose from `linear`, `scaled_linear`, or `squaredcos_cap_v2`. trained_betas (`jnp.ndarray`, optional): option to pass an array of betas directly to the constructor to bypass `beta_start`, `beta_end` etc. skip_prk_steps (`bool`): allows the scheduler to skip the Runge-Kutta steps that are defined in the original paper as being required before plms steps; defaults to `False`. set_alpha_to_one (`bool`, default `False`): each diffusion step uses the value of alphas product at that step and at the previous one. For the final step there is no previous alpha. When this option is `True` the previous alpha product is fixed to `1`, otherwise it uses the value of alpha at step 0. steps_offset (`int`, default `0`): an offset added to the inference steps. You can use a combination of `offset=1` and `set_alpha_to_one=False`, to make the last step use step 0 for the previous alpha product, as done in stable diffusion. """ _compatibles = _FLAX_COMPATIBLE_STABLE_DIFFUSION_SCHEDULERS.copy() @property def has_state(self): return True @register_to_config def __init__( self, num_train_timesteps: int = 1000, beta_start: float = 0.0001, beta_end: float = 0.02, beta_schedule: str = "linear", trained_betas: Optional[jnp.ndarray] = None, skip_prk_steps: bool = False, set_alpha_to_one: bool = False, steps_offset: int = 0, ): if trained_betas is not None: self.betas = jnp.asarray(trained_betas) elif beta_schedule == "linear": self.betas = jnp.linspace(beta_start, beta_end, num_train_timesteps, dtype=jnp.float32) elif beta_schedule == "scaled_linear": # this schedule is very specific to the latent diffusion model. self.betas = jnp.linspace(beta_start**0.5, beta_end**0.5, num_train_timesteps, dtype=jnp.float32) ** 2 elif beta_schedule == "squaredcos_cap_v2": # Glide cosine schedule self.betas = betas_for_alpha_bar(num_train_timesteps) else: raise NotImplementedError(f"{beta_schedule} does is not implemented for {self.__class__}") self.alphas = 1.0 - self.betas self.alphas_cumprod = jnp.cumprod(self.alphas, axis=0) self.final_alpha_cumprod = jnp.array(1.0) if set_alpha_to_one else self.alphas_cumprod[0] # For now we only support F-PNDM, i.e. the runge-kutta method # For more information on the algorithm please take a look at the paper: https://arxiv.org/pdf/2202.09778.pdf # mainly at formula (9), (12), (13) and the Algorithm 2. self.pndm_order = 4 # standard deviation of the initial noise distribution self.init_noise_sigma = 1.0 def create_state(self): return PNDMSchedulerState.create(num_train_timesteps=self.config.num_train_timesteps) def set_timesteps(self, state: PNDMSchedulerState, num_inference_steps: int, shape: Tuple) -> PNDMSchedulerState: """ Sets the discrete timesteps used for the diffusion chain. Supporting function to be run before inference. Args: state (`PNDMSchedulerState`): the `FlaxPNDMScheduler` state data class instance. num_inference_steps (`int`): the number of diffusion steps used when generating samples with a pre-trained model. shape (`Tuple`): the shape of the samples to be generated. """ offset = self.config.steps_offset step_ratio = self.config.num_train_timesteps // num_inference_steps # creates integer timesteps by multiplying by ratio # rounding to avoid issues when num_inference_step is power of 3 _timesteps = (jnp.arange(0, num_inference_steps) * step_ratio).round() + offset state = state.replace(num_inference_steps=num_inference_steps, _timesteps=_timesteps) if self.config.skip_prk_steps: # for some models like stable diffusion the prk steps can/should be skipped to # produce better results. When using PNDM with `self.config.skip_prk_steps` the implementation # is based on crowsonkb's PLMS sampler implementation: https://github.com/CompVis/latent-diffusion/pull/51 state = state.replace( prk_timesteps=jnp.array([]), plms_timesteps=jnp.concatenate( [state._timesteps[:-1], state._timesteps[-2:-1], state._timesteps[-1:]] )[::-1], ) else: prk_timesteps = jnp.array(state._timesteps[-self.pndm_order :]).repeat(2) + jnp.tile( jnp.array([0, self.config.num_train_timesteps // num_inference_steps // 2]), self.pndm_order ) state = state.replace( prk_timesteps=(prk_timesteps[:-1].repeat(2)[1:-1])[::-1], plms_timesteps=state._timesteps[:-3][::-1], ) return state.replace( timesteps=jnp.concatenate([state.prk_timesteps, state.plms_timesteps]).astype(jnp.int32), counter=0, # Reserve space for the state variables cur_model_output=jnp.zeros(shape), cur_sample=jnp.zeros(shape), ets=jnp.zeros((4,) + shape), ) def scale_model_input( self, state: PNDMSchedulerState, sample: jnp.ndarray, timestep: Optional[int] = None ) -> jnp.ndarray: """ Ensures interchangeability with schedulers that need to scale the denoising model input depending on the current timestep. Args: state (`PNDMSchedulerState`): the `FlaxPNDMScheduler` state data class instance. sample (`jnp.ndarray`): input sample timestep (`int`, optional): current timestep Returns: `jnp.ndarray`: scaled input sample """ return sample def step( self, state: PNDMSchedulerState, model_output: jnp.ndarray, timestep: int, sample: jnp.ndarray, return_dict: bool = True, ) -> Union[FlaxPNDMSchedulerOutput, Tuple]: """ Predict the sample at the previous timestep by reversing the SDE. Core function to propagate the diffusion process from the learned model outputs (most often the predicted noise). This function calls `step_prk()` or `step_plms()` depending on the internal variable `counter`. Args: state (`PNDMSchedulerState`): the `FlaxPNDMScheduler` state data class instance. model_output (`jnp.ndarray`): direct output from learned diffusion model. timestep (`int`): current discrete timestep in the diffusion chain. sample (`jnp.ndarray`): current instance of sample being created by diffusion process. return_dict (`bool`): option for returning tuple rather than FlaxPNDMSchedulerOutput class Returns: [`FlaxPNDMSchedulerOutput`] or `tuple`: [`FlaxPNDMSchedulerOutput`] if `return_dict` is True, otherwise a `tuple`. When returning a tuple, the first element is the sample tensor. """ if self.config.skip_prk_steps: prev_sample, state = self.step_plms( state=state, model_output=model_output, timestep=timestep, sample=sample ) else: prev_sample, state = jax.lax.switch( jnp.where(state.counter < len(state.prk_timesteps), 0, 1), (self.step_prk, self.step_plms), # Args to either branch state, model_output, timestep, sample, ) if not return_dict: return (prev_sample, state) return FlaxPNDMSchedulerOutput(prev_sample=prev_sample, state=state) def step_prk( self, state: PNDMSchedulerState, model_output: jnp.ndarray, timestep: int, sample: jnp.ndarray, ) -> Union[FlaxPNDMSchedulerOutput, Tuple]: """ Step function propagating the sample with the Runge-Kutta method. RK takes 4 forward passes to approximate the solution to the differential equation. Args: state (`PNDMSchedulerState`): the `FlaxPNDMScheduler` state data class instance. model_output (`jnp.ndarray`): direct output from learned diffusion model. timestep (`int`): current discrete timestep in the diffusion chain. sample (`jnp.ndarray`): current instance of sample being created by diffusion process. return_dict (`bool`): option for returning tuple rather than FlaxPNDMSchedulerOutput class Returns: [`FlaxPNDMSchedulerOutput`] or `tuple`: [`FlaxPNDMSchedulerOutput`] if `return_dict` is True, otherwise a `tuple`. When returning a tuple, the first element is the sample tensor. """ if state.num_inference_steps is None: raise ValueError( "Number of inference steps is 'None', you need to run 'set_timesteps' after creating the scheduler" ) diff_to_prev = jnp.where( state.counter % 2, 0, self.config.num_train_timesteps // state.num_inference_steps // 2 ) prev_timestep = timestep - diff_to_prev timestep = state.prk_timesteps[state.counter // 4 * 4] def remainder_0(state: PNDMSchedulerState, model_output: jnp.ndarray, ets_at: int): return ( state.replace( cur_model_output=state.cur_model_output + 1 / 6 * model_output, ets=state.ets.at[ets_at].set(model_output), cur_sample=sample, ), model_output, ) def remainder_1(state: PNDMSchedulerState, model_output: jnp.ndarray, ets_at: int): return state.replace(cur_model_output=state.cur_model_output + 1 / 3 * model_output), model_output def remainder_2(state: PNDMSchedulerState, model_output: jnp.ndarray, ets_at: int): return state.replace(cur_model_output=state.cur_model_output + 1 / 3 * model_output), model_output def remainder_3(state: PNDMSchedulerState, model_output: jnp.ndarray, ets_at: int): model_output = state.cur_model_output + 1 / 6 * model_output return state.replace(cur_model_output=jnp.zeros_like(state.cur_model_output)), model_output state, model_output = jax.lax.switch( state.counter % 4, (remainder_0, remainder_1, remainder_2, remainder_3), # Args to either branch state, model_output, state.counter // 4, ) cur_sample = state.cur_sample prev_sample = self._get_prev_sample(cur_sample, timestep, prev_timestep, model_output) state = state.replace(counter=state.counter + 1) return (prev_sample, state) def step_plms( self, state: PNDMSchedulerState, model_output: jnp.ndarray, timestep: int, sample: jnp.ndarray, ) -> Union[FlaxPNDMSchedulerOutput, Tuple]: """ Step function propagating the sample with the linear multi-step method. This has one forward pass with multiple times to approximate the solution. Args: state (`PNDMSchedulerState`): the `FlaxPNDMScheduler` state data class instance. model_output (`jnp.ndarray`): direct output from learned diffusion model. timestep (`int`): current discrete timestep in the diffusion chain. sample (`jnp.ndarray`): current instance of sample being created by diffusion process. return_dict (`bool`): option for returning tuple rather than FlaxPNDMSchedulerOutput class Returns: [`FlaxPNDMSchedulerOutput`] or `tuple`: [`FlaxPNDMSchedulerOutput`] if `return_dict` is True, otherwise a `tuple`. When returning a tuple, the first element is the sample tensor. """ if state.num_inference_steps is None: raise ValueError( "Number of inference steps is 'None', you need to run 'set_timesteps' after creating the scheduler" ) if not self.config.skip_prk_steps and len(state.ets) < 3: raise ValueError( f"{self.__class__} can only be run AFTER scheduler has been run " "in 'prk' mode for at least 12 iterations " "See: https://github.com/huggingface/diffusers/blob/main/src/diffusers/pipelines/pipeline_pndm.py " "for more information." ) prev_timestep = timestep - self.config.num_train_timesteps // state.num_inference_steps prev_timestep = jnp.where(prev_timestep > 0, prev_timestep, 0) # Reference: # if state.counter != 1: # state.ets.append(model_output) # else: # prev_timestep = timestep # timestep = timestep + self.config.num_train_timesteps // state.num_inference_steps prev_timestep = jnp.where(state.counter == 1, timestep, prev_timestep) timestep = jnp.where( state.counter == 1, timestep + self.config.num_train_timesteps // state.num_inference_steps, timestep ) # Reference: # if len(state.ets) == 1 and state.counter == 0: # model_output = model_output # state.cur_sample = sample # elif len(state.ets) == 1 and state.counter == 1: # model_output = (model_output + state.ets[-1]) / 2 # sample = state.cur_sample # state.cur_sample = None # elif len(state.ets) == 2: # model_output = (3 * state.ets[-1] - state.ets[-2]) / 2 # elif len(state.ets) == 3: # model_output = (23 * state.ets[-1] - 16 * state.ets[-2] + 5 * state.ets[-3]) / 12 # else: # model_output = (1 / 24) * (55 * state.ets[-1] - 59 * state.ets[-2] + 37 * state.ets[-3] - 9 * state.ets[-4]) def counter_0(state: PNDMSchedulerState): ets = state.ets.at[0].set(model_output) return state.replace( ets=ets, cur_sample=sample, cur_model_output=jnp.array(model_output, dtype=jnp.float32), ) def counter_1(state: PNDMSchedulerState): return state.replace( cur_model_output=(model_output + state.ets[0]) / 2, ) def counter_2(state: PNDMSchedulerState): ets = state.ets.at[1].set(model_output) return state.replace( ets=ets, cur_model_output=(3 * ets[1] - ets[0]) / 2, cur_sample=sample, ) def counter_3(state: PNDMSchedulerState): ets = state.ets.at[2].set(model_output) return state.replace( ets=ets, cur_model_output=(23 * ets[2] - 16 * ets[1] + 5 * ets[0]) / 12, cur_sample=sample, ) def counter_other(state: PNDMSchedulerState): ets = state.ets.at[3].set(model_output) next_model_output = (1 / 24) * (55 * ets[3] - 59 * ets[2] + 37 * ets[1] - 9 * ets[0]) ets = ets.at[0].set(ets[1]) ets = ets.at[1].set(ets[2]) ets = ets.at[2].set(ets[3]) return state.replace( ets=ets, cur_model_output=next_model_output, cur_sample=sample, ) counter = jnp.clip(state.counter, 0, 4) state = jax.lax.switch( counter, [counter_0, counter_1, counter_2, counter_3, counter_other], state, ) sample = state.cur_sample model_output = state.cur_model_output prev_sample = self._get_prev_sample(sample, timestep, prev_timestep, model_output) state = state.replace(counter=state.counter + 1) return (prev_sample, state) def _get_prev_sample(self, sample, timestep, prev_timestep, model_output): # See formula (9) of PNDM paper https://arxiv.org/pdf/2202.09778.pdf # this function computes x_(t−δ) using the formula of (9) # Note that x_t needs to be added to both sides of the equation # Notation ( -> # alpha_prod_t -> α_t # alpha_prod_t_prev -> α_(t−δ) # beta_prod_t -> (1 - α_t) # beta_prod_t_prev -> (1 - α_(t−δ)) # sample -> x_t # model_output -> e_θ(x_t, t) # prev_sample -> x_(t−δ) alpha_prod_t = self.alphas_cumprod[timestep] alpha_prod_t_prev = jnp.where(prev_timestep >= 0, self.alphas_cumprod[prev_timestep], self.final_alpha_cumprod) beta_prod_t = 1 - alpha_prod_t beta_prod_t_prev = 1 - alpha_prod_t_prev # corresponds to (α_(t−δ) - α_t) divided by # denominator of x_t in formula (9) and plus 1 # Note: (α_(t−δ) - α_t) / (sqrt(α_t) * (sqrt(α_(t−δ)) + sqr(α_t))) = # sqrt(α_(t−δ)) / sqrt(α_t)) sample_coeff = (alpha_prod_t_prev / alpha_prod_t) ** (0.5) # corresponds to denominator of e_θ(x_t, t) in formula (9) model_output_denom_coeff = alpha_prod_t * beta_prod_t_prev ** (0.5) + ( alpha_prod_t * beta_prod_t * alpha_prod_t_prev ) ** (0.5) # full formula (9) prev_sample = ( sample_coeff * sample - (alpha_prod_t_prev - alpha_prod_t) * model_output / model_output_denom_coeff ) return prev_sample def add_noise( self, original_samples: jnp.ndarray, noise: jnp.ndarray, timesteps: jnp.ndarray, ) -> jnp.ndarray: sqrt_alpha_prod = self.alphas_cumprod[timesteps] ** 0.5 sqrt_alpha_prod = sqrt_alpha_prod.flatten() sqrt_alpha_prod = broadcast_to_shape_from_left(sqrt_alpha_prod, original_samples.shape) sqrt_one_minus_alpha_prod = (1 - self.alphas_cumprod[timesteps]) ** 0.5 sqrt_one_minus_alpha_prod = sqrt_one_minus_alpha_prod.flatten() sqrt_one_minus_alpha_prod = broadcast_to_shape_from_left(sqrt_one_minus_alpha_prod, original_samples.shape) noisy_samples = sqrt_alpha_prod * original_samples + sqrt_one_minus_alpha_prod * noise return noisy_samples def __len__(self): return self.config.num_train_timesteps