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	# # Copyright 2024 Yuehao Wang (https://github.com/yuehaowang). This part of code is borrowed form ["Bilateral Guided Radiance Field Processing"](https://bilarfpro.github.io/).
	#
	# 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.

	"""
	This is a standalone PyTorch implementation of 3D bilateral grid and CP-decomposed 4D bilateral grid.
	To use this module, you can download the "lib_bilagrid.py" file and simply put it in your project directory.

	For the details, please check our research project: ["Bilateral Guided Radiance Field Processing"](https://bilarfpro.github.io/).

	#### Dependencies

	In addition to PyTorch and Numpy, please install [tensorly](https://github.com/tensorly/tensorly).
	We have tested this module on Python 3.9.18, PyTorch 2.0.1 (CUDA 11), tensorly 0.8.1, and Numpy 1.25.2.

	#### Overview

	- For bilateral guided training, you need to construct a `BilateralGrid` instance, which can hold multiple bilateral grids
	for input views. Then, use `slice` function to obtain transformed RGB output and the corresponding affine transformations.

	- For bilateral guided finishing, you need to instantiate a `BilateralGridCP4D` object and use `slice4d`.

	#### Examples

	- Bilateral grid for approximating ISP:
	<a target="_blank" href="https://colab.research.google.com/drive/1tx2qKtsHH9deDDnParMWrChcsa9i7Prr?usp=sharing">
	<img src="https://colab.research.google.com/assets/colab-badge.svg" alt="Open In Colab"/></a>

	- Low-rank 4D bilateral grid for MR enhancement:
	<a target="_blank" href="https://colab.research.google.com/drive/17YOjQqgWFT3QI1vysOIH494rMYtt_mHL?usp=sharing">
	<img src="https://colab.research.google.com/assets/colab-badge.svg" alt="Open In Colab"/></a>


	Below is the API reference.

	"""

	import tensorly as tl
	import torch
	import torch.nn.functional as F
	from torch import nn

	tl.set_backend("pytorch")


	def color_correct(
	img: torch.Tensor, ref: torch.Tensor, num_iters: int = 5, eps: float = 0.5 / 255
	) -> torch.Tensor:
	"""
	Warp `img` to match the colors in `ref_img` using iterative color matching.

	This function performs color correction by warping the colors of the input image
	to match those of a reference image. It uses a least squares method to find a
	transformation that maps the input image's colors to the reference image's colors.

	The algorithm iteratively solves a system of linear equations, updating the set of
	unsaturated pixels in each iteration. This approach helps handle non-linear color
	transformations and reduces the impact of clipping.

	Args:
	img (torch.Tensor): Input image to be color corrected. Shape: [..., num_channels]
	ref (torch.Tensor): Reference image to match colors. Shape: [..., num_channels]
	num_iters (int, optional): Number of iterations for the color matching process.
	Default is 5.
	eps (float, optional): Small value to determine the range of unclipped pixels.
	Default is 0.5 / 255.

	Returns:
	torch.Tensor: Color corrected image with the same shape as the input image.

	Note:
	- Both input and reference images should be in the range [0, 1].
	- The function works with any number of channels, but typically used with 3 (RGB).
	"""
	if img.shape[-1] != ref.shape[-1]:
	raise ValueError(
	f"img's {img.shape[-1]} and ref's {ref.shape[-1]} channels must match"
	)
	num_channels = img.shape[-1]
	img_mat = img.reshape([-1, num_channels])
	ref_mat = ref.reshape([-1, num_channels])

	def is_unclipped(z):
	return (z >= eps) & (z <= 1 - eps) # z \in [eps, 1-eps].

	mask0 = is_unclipped(img_mat)
	# Because the set of saturated pixels may change after solving for a
	# transformation, we repeatedly solve a system `num_iters` times and update
	# our estimate of which pixels are saturated.
	for _ in range(num_iters):
	# Construct the left hand side of a linear system that contains a quadratic
	# expansion of each pixel of `img`.
	a_mat = []
	for c in range(num_channels):
	a_mat.append(img_mat[:, c : (c + 1)] * img_mat[:, c:]) # Quadratic term.
	a_mat.append(img_mat) # Linear term.
	a_mat.append(torch.ones_like(img_mat[:, :1])) # Bias term.
	a_mat = torch.cat(a_mat, dim=-1)
	warp = []
	for c in range(num_channels):
	# Construct the right hand side of a linear system containing each color
	# of `ref`.
	b = ref_mat[:, c]
	# Ignore rows of the linear system that were saturated in the input or are
	# saturated in the current corrected color estimate.
	mask = mask0[:, c] & is_unclipped(img_mat[:, c]) & is_unclipped(b)
	ma_mat = torch.where(mask[:, None], a_mat, torch.zeros_like(a_mat))
	mb = torch.where(mask, b, torch.zeros_like(b))
	w = torch.linalg.lstsq(ma_mat, mb, rcond=-1)[0]
	assert torch.all(torch.isfinite(w))
	warp.append(w)
	warp = torch.stack(warp, dim=-1)
	# Apply the warp to update img_mat.
	img_mat = torch.clip(torch.matmul(a_mat, warp), 0, 1)
	corrected_img = torch.reshape(img_mat, img.shape)
	return corrected_img


	def bilateral_grid_tv_loss(model, config):
	"""Computes total variations of bilateral grids."""
	total_loss = 0.0

	for bil_grids in model.bil_grids:
	total_loss += config.bilgrid_tv_loss_mult * total_variation_loss(
	bil_grids.grids
	)

	return total_loss


	def color_affine_transform(affine_mats, rgb):
	"""Applies color affine transformations.

	Args:
	affine_mats (torch.Tensor): Affine transformation matrices. Supported shape: $(..., 3, 4)$.
	rgb (torch.Tensor): Input RGB values. Supported shape: $(..., 3)$.

	Returns:
	Output transformed colors of shape $(..., 3)$.
	"""
	return (
	torch.matmul(affine_mats[..., :3], rgb.unsqueeze(-1)).squeeze(-1)
	+ affine_mats[..., 3]
	)


	def _num_tensor_elems(t):
	return max(torch.prod(torch.tensor(t.size()[1:]).float()).item(), 1.0)


	def total_variation_loss(x): # noqa: F811
	"""Returns total variation on multi-dimensional tensors.

	Args:
	x (torch.Tensor): The input tensor with shape $(B, C, ...)$, where $B$ is the batch size and $C$ is the channel size.
	"""
	batch_size = x.shape[0]
	tv = 0
	for i in range(2, len(x.shape)):
	n_res = x.shape[i]
	idx1 = torch.arange(1, n_res, device=x.device)
	idx2 = torch.arange(0, n_res - 1, device=x.device)
	x1 = x.index_select(i, idx1)
	x2 = x.index_select(i, idx2)
	count = _num_tensor_elems(x1)
	tv += torch.pow((x1 - x2), 2).sum() / count
	return tv / batch_size


	def slice(bil_grids, xy, rgb, grid_idx):
	"""Slices a batch of 3D bilateral grids by pixel coordinates `xy` and gray-scale guidances of pixel colors `rgb`.

	Supports 2-D, 3-D, and 4-D input shapes. The first dimension of the input is the batch size
	and the last dimension is 2 for `xy`, 3 for `rgb`, and 1 for `grid_idx`.

	The return value is a dictionary containing the affine transformations `affine_mats` sliced from bilateral grids and
	the output color `rgb_out` after applying the afffine transformations.

	In the 2-D input case, `xy` is a $(N, 2)$ tensor, `rgb` is a $(N, 3)$ tensor, and `grid_idx` is a $(N, 1)$ tensor.
	Then `affine_mats[i]` can be obtained via slicing the bilateral grid indexed at `grid_idx[i]` by `xy[i, :]` and `rgb2gray(rgb[i, :])`.
	For 3-D and 4-D input cases, the behavior of indexing bilateral grids and coordinates is the same with the 2-D case.

	.. note::
	This function can be regarded as a wrapper of `color_affine_transform` and `BilateralGrid` with a slight performance improvement.
	When `grid_idx` contains a unique index, only a single bilateral grid will used during the slicing. In this case, this function will not
	perform tensor indexing to avoid data copy and extra memory
	(see [this](https://discuss.pytorch.org/t/does-indexing-a-tensor-return-a-copy-of-it/164905)).

	Args:
	bil_grids (`BilateralGrid`): An instance of $N$ bilateral grids.
	xy (torch.Tensor): The x-y coordinates of shape $(..., 2)$ in the range of $[0,1]$.
	rgb (torch.Tensor): The RGB values of shape $(..., 3)$ for computing the guidance coordinates, ranging in $[0,1]$.
	grid_idx (torch.Tensor): The indices of bilateral grids for each slicing. Shape: $(..., 1)$.

	Returns:
	A dictionary with keys and values as follows:
	```
	{
	"rgb": Transformed RGB colors. Shape: (..., 3),
	"rgb_affine_mats": The sliced affine transformation matrices from bilateral grids. Shape: (..., 3, 4)
	}
	```
	"""

	sh_ = rgb.shape

	grid_idx_unique = torch.unique(grid_idx)
	if len(grid_idx_unique) == 1:
	# All pixels are from a single view.
	grid_idx = grid_idx_unique # (1,)
	xy = xy.unsqueeze(0) # (1, ..., 2)
	rgb = rgb.unsqueeze(0) # (1, ..., 3)
	else:
	# Pixels are randomly sampled from different views.
	if len(grid_idx.shape) == 4:
	grid_idx = grid_idx[:, 0, 0, 0] # (chunk_size,)
	elif len(grid_idx.shape) == 3:
	grid_idx = grid_idx[:, 0, 0] # (chunk_size,)
	elif len(grid_idx.shape) == 2:
	grid_idx = grid_idx[:, 0] # (chunk_size,)
	else:
	raise ValueError(
	"The input to bilateral grid slicing is not supported yet."
	)

	affine_mats = bil_grids(xy, rgb, grid_idx)
	rgb = color_affine_transform(affine_mats, rgb)

	return {
	"rgb": rgb.reshape(*sh_),
	"rgb_affine_mats": affine_mats.reshape(
	*sh_[:-1], affine_mats.shape[-2], affine_mats.shape[-1]
	),
	}


	class BilateralGrid(nn.Module):
	"""Class for 3D bilateral grids.

	Holds one or more than one bilateral grids.
	"""

	def __init__(self, num, grid_X=16, grid_Y=16, grid_W=8):
	"""
	Args:
	num (int): The number of bilateral grids (i.e., the number of views).
	grid_X (int): Defines grid width $W$.
	grid_Y (int): Defines grid height $H$.
	grid_W (int): Defines grid guidance dimension $L$.
	"""
	super(BilateralGrid, self).__init__()

	self.grid_width = grid_X
	"""Grid width. Type: int."""
	self.grid_height = grid_Y
	"""Grid height. Type: int."""
	self.grid_guidance = grid_W
	"""Grid guidance dimension. Type: int."""

	# Initialize grids.
	grid = self._init_identity_grid()
	self.grids = nn.Parameter(grid.tile(num, 1, 1, 1, 1)) # (N, 12, L, H, W)
	""" A 5-D tensor of shape $(N, 12, L, H, W)$."""

	# Weights of BT601 RGB-to-gray.
	self.register_buffer("rgb2gray_weight", torch.Tensor([[0.299, 0.587, 0.114]]))
	self.rgb2gray = lambda rgb: (rgb @ self.rgb2gray_weight.T) * 2.0 - 1.0
	""" A function that converts RGB to gray-scale guidance in $[-1, 1]$."""

	def _init_identity_grid(self):
	grid = torch.tensor(
	[
	1.0,
	0,
	0,
	0,
	0,
	1.0,
	0,
	0,
	0,
	0,
	1.0,
	0,
	]
	).float()
	grid = grid.repeat(
	[self.grid_guidance * self.grid_height * self.grid_width, 1]
	) # (L * H * W, 12)
	grid = grid.reshape(
	1, self.grid_guidance, self.grid_height, self.grid_width, -1
	) # (1, L, H, W, 12)
	grid = grid.permute(0, 4, 1, 2, 3) # (1, 12, L, H, W)
	return grid

	def tv_loss(self):
	"""Computes and returns total variation loss on the bilateral grids."""
	return total_variation_loss(self.grids)

	def forward(self, grid_xy, rgb, idx=None):
	"""Bilateral grid slicing. Supports 2-D, 3-D, 4-D, and 5-D input.
	For the 2-D, 3-D, and 4-D cases, please refer to `slice`.
	For the 5-D cases, `idx` will be unused and the first dimension of `xy` should be
	equal to the number of bilateral grids. Then this function becomes PyTorch's
	[`F.grid_sample`](https://pytorch.org/docs/stable/generated/torch.nn.functional.grid_sample.html).

	Args:
	grid_xy (torch.Tensor): The x-y coordinates in the range of $[0,1]$.
	rgb (torch.Tensor): The RGB values in the range of $[0,1]$.
	idx (torch.Tensor): The bilateral grid indices.

	Returns:
	Sliced affine matrices of shape $(..., 3, 4)$.
	"""

	grids = self.grids
	input_ndims = len(grid_xy.shape)
	assert len(rgb.shape) == input_ndims

	if input_ndims > 1 and input_ndims < 5:
	# Convert input into 5D
	for i in range(5 - input_ndims):
	grid_xy = grid_xy.unsqueeze(1)
	rgb = rgb.unsqueeze(1)
	assert idx is not None
	elif input_ndims != 5:
	raise ValueError(
	"Bilateral grid slicing only takes either 2D, 3D, 4D and 5D inputs"
	)

	grids = self.grids
	if idx is not None:
	grids = grids[idx]
	assert grids.shape[0] == grid_xy.shape[0]

	# Generate slicing coordinates.
	grid_xy = (grid_xy - 0.5) * 2 # Rescale to [-1, 1].
	grid_z = self.rgb2gray(rgb)

	# print(grid_xy.shape, grid_z.shape)
	# exit()
	grid_xyz = torch.cat([grid_xy, grid_z], dim=-1) # (N, m, h, w, 3)

	affine_mats = F.grid_sample(
	grids, grid_xyz, mode="bilinear", align_corners=True, padding_mode="border"
	) # (N, 12, m, h, w)
	affine_mats = affine_mats.permute(0, 2, 3, 4, 1) # (N, m, h, w, 12)
	affine_mats = affine_mats.reshape(
	*affine_mats.shape[:-1], 3, 4
	) # (N, m, h, w, 3, 4)

	for _ in range(5 - input_ndims):
	affine_mats = affine_mats.squeeze(1)

	return affine_mats


	def slice4d(bil_grid4d, xyz, rgb):
	"""Slices a 4D bilateral grid by point coordinates `xyz` and gray-scale guidances of radiance colors `rgb`.

	Args:
	bil_grid4d (`BilateralGridCP4D`): The input 4D bilateral grid.
	xyz (torch.Tensor): The xyz coordinates with shape $(..., 3)$.
	rgb (torch.Tensor): The RGB values with shape $(..., 3)$.

	Returns:
	A dictionary with keys and values as follows:
	```
	{
	"rgb": Transformed radiance RGB colors. Shape: (..., 3),
	"rgb_affine_mats": The sliced affine transformation matrices from the 4D bilateral grid. Shape: (..., 3, 4)
	}
	```
	"""

	affine_mats = bil_grid4d(xyz, rgb)
	rgb = color_affine_transform(affine_mats, rgb)

	return {"rgb": rgb, "rgb_affine_mats": affine_mats}


	class _ScaledTanh(nn.Module):
	def __init__(self, s=2.0):
	super().__init__()
	self.scaler = s

	def forward(self, x):
	return torch.tanh(self.scaler * x)


	class BilateralGridCP4D(nn.Module):
	"""Class for low-rank 4D bilateral grids."""

	def __init__(
	self,
	grid_X=16,
	grid_Y=16,
	grid_Z=16,
	grid_W=8,
	rank=5,
	learn_gray=True,
	gray_mlp_width=8,
	gray_mlp_depth=2,
	init_noise_scale=1e-6,
	bound=2.0,
	):
	"""
	Args:
	grid_X (int): Defines grid width.
	grid_Y (int): Defines grid height.
	grid_Z (int): Defines grid depth.
	grid_W (int): Defines grid guidance dimension.
	rank (int): Rank of the 4D bilateral grid.
	learn_gray (bool): If True, an MLP will be learned to convert RGB colors to gray-scale guidances.
	gray_mlp_width (int): The MLP width for learnable guidance.
	gray_mlp_depth (int): The number of MLP layers for learnable guidance.
	init_noise_scale (float): The noise scale of the initialized factors.
	bound (float): The bound of the xyz coordinates.
	"""
	super(BilateralGridCP4D, self).__init__()

	self.grid_X = grid_X
	"""Grid width. Type: int."""
	self.grid_Y = grid_Y
	"""Grid height. Type: int."""
	self.grid_Z = grid_Z
	"""Grid depth. Type: int."""
	self.grid_W = grid_W
	"""Grid guidance dimension. Type: int."""
	self.rank = rank
	"""Rank of the 4D bilateral grid. Type: int."""
	self.learn_gray = learn_gray
	"""Flags of learnable guidance is used. Type: bool."""
	self.gray_mlp_width = gray_mlp_width
	"""The MLP width for learnable guidance. Type: int."""
	self.gray_mlp_depth = gray_mlp_depth
	"""The MLP depth for learnable guidance. Type: int."""
	self.init_noise_scale = init_noise_scale
	"""The noise scale of the initialized factors. Type: float."""
	self.bound = bound
	"""The bound of the xyz coordinates. Type: float."""

	self._init_cp_factors_parafac()

	self.rgb2gray = None
	""" A function that converts RGB to gray-scale guidances in $[-1, 1]$.
	If `learn_gray` is True, this will be an MLP network."""

	if self.learn_gray:

	def rgb2gray_mlp_linear(layer):
	return nn.Linear(
	self.gray_mlp_width,
	self.gray_mlp_width if layer < self.gray_mlp_depth - 1 else 1,
	)

	def rgb2gray_mlp_actfn(_):
	return nn.ReLU(inplace=True)

	self.rgb2gray = nn.Sequential(
	*(
	[nn.Linear(3, self.gray_mlp_width)]
	+ [
	nn_module(layer)
	for layer in range(1, self.gray_mlp_depth)
	for nn_module in [rgb2gray_mlp_actfn, rgb2gray_mlp_linear]
	]
	+ [_ScaledTanh(2.0)]
	)
	)
	else:
	# Weights of BT601/BT470 RGB-to-gray.
	self.register_buffer(
	"rgb2gray_weight", torch.Tensor([[0.299, 0.587, 0.114]])
	)
	self.rgb2gray = lambda rgb: (rgb @ self.rgb2gray_weight.T) * 2.0 - 1.0

	def _init_identity_grid(self):
	grid = torch.tensor(
	[
	1.0,
	0,
	0,
	0,
	0,
	1.0,
	0,
	0,
	0,
	0,
	1.0,
	0,
	]
	).float()
	grid = grid.repeat([self.grid_W * self.grid_Z * self.grid_Y * self.grid_X, 1])
	grid = grid.reshape(self.grid_W, self.grid_Z, self.grid_Y, self.grid_X, -1)
	grid = grid.permute(4, 0, 1, 2, 3) # (12, grid_W, grid_Z, grid_Y, grid_X)
	return grid

	def _init_cp_factors_parafac(self):
	# Initialize identity grids.
	init_grids = self._init_identity_grid()
	# Random noises are added to avoid singularity.
	init_grids = torch.randn_like(init_grids) * self.init_noise_scale + init_grids
	from tensorly.decomposition import parafac

	# Initialize grid CP factors
	_, facs = parafac(init_grids.clone().detach(), rank=self.rank)

	self.num_facs = len(facs)

	self.fac_0 = nn.Linear(facs[0].shape[0], facs[0].shape[1], bias=False)
	self.fac_0.weight = nn.Parameter(facs[0]) # (12, rank)

	for i in range(1, self.num_facs):
	fac = facs[i].T # (rank, grid_size)
	fac = fac.view(1, fac.shape[0], fac.shape[1], 1) # (1, rank, grid_size, 1)
	self.register_buffer(f"fac_{i}_init", fac)

	fac_resid = torch.zeros_like(fac)
	self.register_parameter(f"fac_{i}", nn.Parameter(fac_resid))

	def tv_loss(self):
	"""Computes and returns total variation loss on the factors of the low-rank 4D bilateral grids."""

	total_loss = 0
	for i in range(1, self.num_facs):
	fac = self.get_parameter(f"fac_{i}")
	total_loss += total_variation_loss(fac)

	return total_loss

	def forward(self, xyz, rgb):
	"""Low-rank 4D bilateral grid slicing.

	Args:
	xyz (torch.Tensor): The xyz coordinates with shape $(..., 3)$.
	rgb (torch.Tensor): The corresponding RGB values with shape $(..., 3)$.

	Returns:
	Sliced affine matrices with shape $(..., 3, 4)$.
	"""
	sh_ = xyz.shape
	xyz = xyz.reshape(-1, 3) # flatten (N, 3)
	rgb = rgb.reshape(-1, 3) # flatten (N, 3)

	xyz = xyz / self.bound
	assert self.rgb2gray is not None
	gray = self.rgb2gray(rgb)
	xyzw = torch.cat([xyz, gray], dim=-1) # (N, 4)
	xyzw = xyzw.transpose(0, 1) # (4, N)
	coords = torch.stack([torch.zeros_like(xyzw), xyzw], dim=-1) # (4, N, 2)
	coords = coords.unsqueeze(1) # (4, 1, N, 2)

	coef = 1.0
	for i in range(1, self.num_facs):
	fac = self.get_parameter(f"fac_{i}") + self.get_buffer(f"fac_{i}_init")
	coef = coef * F.grid_sample(
	fac, coords[[i - 1]], align_corners=True, padding_mode="border"
	) # [1, rank, 1, N]
	coef = coef.squeeze([0, 2]).transpose(0, 1) # (N, rank) #type: ignore
	mat = self.fac_0(coef)
	return mat.reshape(*sh_[:-1], 3, 4)