# This code was taken from: https://github.com/assafshocher/resizer by Assaf Shocher import numpy as np import torch from math import pi from torch import nn class Resizer(nn.Module): def __init__(self, in_shape, scale_factor=None, output_shape=None, kernel=None, antialiasing=True): super(Resizer, self).__init__() # First standardize values and fill missing arguments (if needed) by deriving scale from output shape or vice versa scale_factor, output_shape = self.fix_scale_and_size(in_shape, output_shape, scale_factor) # Choose interpolation method, each method has the matching kernel size method, kernel_width = { "cubic": (cubic, 4.0), "lanczos2": (lanczos2, 4.0), "lanczos3": (lanczos3, 6.0), "box": (box, 1.0), "linear": (linear, 2.0), None: (cubic, 4.0) # set default interpolation method as cubic }.get(kernel) # Antialiasing is only used when downscaling antialiasing *= (np.any(np.array(scale_factor) < 1)) # Sort indices of dimensions according to scale of each dimension. since we are going dim by dim this is efficient sorted_dims = np.argsort(np.array(scale_factor)) self.sorted_dims = [int(dim) for dim in sorted_dims if scale_factor[dim] != 1] # Iterate over dimensions to calculate local weights for resizing and resize each time in one direction field_of_view_list = [] weights_list = [] for dim in self.sorted_dims: # for each coordinate (along 1 dim), calculate which coordinates in the input image affect its result and the # weights that multiply the values there to get its result. weights, field_of_view = self.contributions(in_shape[dim], output_shape[dim], scale_factor[dim], method, kernel_width, antialiasing) # convert to torch tensor weights = torch.tensor(weights.T, dtype=torch.float32) # We add singleton dimensions to the weight matrix so we can multiply it with the big tensor we get for # tmp_im[field_of_view.T], (bsxfun style) weights_list.append( nn.Parameter(torch.reshape(weights, list(weights.shape) + (len(scale_factor) - 1) * [1]), requires_grad=False)) field_of_view_list.append( nn.Parameter(torch.tensor(field_of_view.T.astype(np.int32), dtype=torch.long), requires_grad=False)) self.field_of_view = nn.ParameterList(field_of_view_list) self.weights = nn.ParameterList(weights_list) def forward(self, in_tensor): x = in_tensor # Use the affecting position values and the set of weights to calculate the result of resizing along this 1 dim for dim, fov, w in zip(self.sorted_dims, self.field_of_view, self.weights): # To be able to act on each dim, we swap so that dim 0 is the wanted dim to resize x = torch.transpose(x, dim, 0) # This is a bit of a complicated multiplication: x[field_of_view.T] is a tensor of order image_dims+1. # for each pixel in the output-image it matches the positions the influence it from the input image (along 1 dim # only, this is why it only adds 1 dim to 5the shape). We then multiply, for each pixel, its set of positions with # the matching set of weights. we do this by this big tensor element-wise multiplication (MATLAB bsxfun style: # matching dims are multiplied element-wise while singletons mean that the matching dim is all multiplied by the # same number x = torch.sum(x[fov] * w, dim=0) # Finally we swap back the axes to the original order x = torch.transpose(x, dim, 0) return x def fix_scale_and_size(self, input_shape, output_shape, scale_factor): # First fixing the scale-factor (if given) to be standardized the function expects (a list of scale factors in the # same size as the number of input dimensions) if scale_factor is not None: # By default, if scale-factor is a scalar we assume 2d resizing and duplicate it. if np.isscalar(scale_factor) and len(input_shape) > 1: scale_factor = [scale_factor, scale_factor] # We extend the size of scale-factor list to the size of the input by assigning 1 to all the unspecified scales scale_factor = list(scale_factor) scale_factor = [1] * (len(input_shape) - len(scale_factor)) + scale_factor # Fixing output-shape (if given): extending it to the size of the input-shape, by assigning the original input-size # to all the unspecified dimensions if output_shape is not None: output_shape = list(input_shape[len(output_shape):]) + list(np.uint(np.array(output_shape))) # Dealing with the case of non-give scale-factor, calculating according to output-shape. note that this is # sub-optimal, because there can be different scales to the same output-shape. if scale_factor is None: scale_factor = 1.0 * np.array(output_shape) / np.array(input_shape) # Dealing with missing output-shape. calculating according to scale-factor if output_shape is None: output_shape = np.uint(np.ceil(np.array(input_shape) * np.array(scale_factor))) return scale_factor, output_shape def contributions(self, in_length, out_length, scale, kernel, kernel_width, antialiasing): # This function calculates a set of 'filters' and a set of field_of_view that will later on be applied # such that each position from the field_of_view will be multiplied with a matching filter from the # 'weights' based on the interpolation method and the distance of the sub-pixel location from the pixel centers # around it. This is only done for one dimension of the image. # When anti-aliasing is activated (default and only for downscaling) the receptive field is stretched to size of # 1/sf. this means filtering is more 'low-pass filter'. fixed_kernel = (lambda arg: scale * kernel(scale * arg)) if antialiasing else kernel kernel_width *= 1.0 / scale if antialiasing else 1.0 # These are the coordinates of the output image out_coordinates = np.arange(1, out_length + 1) # since both scale-factor and output size can be provided simulatneously, perserving the center of the image requires shifting # the output coordinates. the deviation is because out_length doesn't necesary equal in_length*scale. # to keep the center we need to subtract half of this deivation so that we get equal margins for boths sides and center is preserved. shifted_out_coordinates = out_coordinates - (out_length - in_length * scale) / 2 # These are the matching positions of the output-coordinates on the input image coordinates. # Best explained by example: say we have 4 horizontal pixels for HR and we downscale by SF=2 and get 2 pixels: # [1,2,3,4] -> [1,2]. Remember each pixel number is the middle of the pixel. # The scaling is done between the distances and not pixel numbers (the right boundary of pixel 4 is transformed to # the right boundary of pixel 2. pixel 1 in the small image matches the boundary between pixels 1 and 2 in the big # one and not to pixel 2. This means the position is not just multiplication of the old pos by scale-factor). # So if we measure distance from the left border, middle of pixel 1 is at distance d=0.5, border between 1 and 2 is # at d=1, and so on (d = p - 0.5). we calculate (d_new = d_old / sf) which means: # (p_new-0.5 = (p_old-0.5) / sf) -> p_new = p_old/sf + 0.5 * (1-1/sf) match_coordinates = shifted_out_coordinates / scale + 0.5 * (1 - 1 / scale) # This is the left boundary to start multiplying the filter from, it depends on the size of the filter left_boundary = np.floor(match_coordinates - kernel_width / 2) # Kernel width needs to be enlarged because when covering has sub-pixel borders, it must 'see' the pixel centers # of the pixels it only covered a part from. So we add one pixel at each side to consider (weights can zeroize them) expanded_kernel_width = np.ceil(kernel_width) + 2 # Determine a set of field_of_view for each each output position, these are the pixels in the input image # that the pixel in the output image 'sees'. We get a matrix whos horizontal dim is the output pixels (big) and the # vertical dim is the pixels it 'sees' (kernel_size + 2) field_of_view = np.squeeze( np.int16(np.expand_dims(left_boundary, axis=1) + np.arange(expanded_kernel_width) - 1)) # Assign weight to each pixel in the field of view. A matrix whos horizontal dim is the output pixels and the # vertical dim is a list of weights matching to the pixel in the field of view (that are specified in # 'field_of_view') weights = fixed_kernel(1.0 * np.expand_dims(match_coordinates, axis=1) - field_of_view - 1) # Normalize weights to sum up to 1. be careful from dividing by 0 sum_weights = np.sum(weights, axis=1) sum_weights[sum_weights == 0] = 1.0 weights = 1.0 * weights / np.expand_dims(sum_weights, axis=1) # We use this mirror structure as a trick for reflection padding at the boundaries mirror = np.uint(np.concatenate((np.arange(in_length), np.arange(in_length - 1, -1, step=-1)))) field_of_view = mirror[np.mod(field_of_view, mirror.shape[0])] # Get rid of weights and pixel positions that are of zero weight non_zero_out_pixels = np.nonzero(np.any(weights, axis=0)) weights = np.squeeze(weights[:, non_zero_out_pixels]) field_of_view = np.squeeze(field_of_view[:, non_zero_out_pixels]) # Final products are the relative positions and the matching weights, both are output_size X fixed_kernel_size return weights, field_of_view # These next functions are all interpolation methods. x is the distance from the left pixel center def cubic(x): absx = np.abs(x) absx2 = absx ** 2 absx3 = absx ** 3 return ((1.5 * absx3 - 2.5 * absx2 + 1) * (absx <= 1) + (-0.5 * absx3 + 2.5 * absx2 - 4 * absx + 2) * ((1 < absx) & (absx <= 2))) def lanczos2(x): return (((np.sin(pi * x) * np.sin(pi * x / 2) + np.finfo(np.float32).eps) / ((pi ** 2 * x ** 2 / 2) + np.finfo(np.float32).eps)) * (abs(x) < 2)) def box(x): return ((-0.5 <= x) & (x < 0.5)) * 1.0 def lanczos3(x): return (((np.sin(pi * x) * np.sin(pi * x / 3) + np.finfo(np.float32).eps) / ((pi ** 2 * x ** 2 / 3) + np.finfo(np.float32).eps)) * (abs(x) < 3)) def linear(x): return (x + 1) * ((-1 <= x) & (x < 0)) + (1 - x) * ((0 <= x) & (x <= 1))