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Stein's Unbiased Risk Estimator (SURE) loss and Conjugate Gradient (P…
…roject-MONAI#7308) ### Description Based on the discussion topic [here](Project-MONAI#7161 (comment)), we implemented the Conjugate-Gradient algorithm for linear operator inversion, and Stein's Unbiased Risk Estimator (SURE) [1] loss for ground-truth-date free diffusion process guidance that is proposed in [2] and illustrated in the algorithm below: <img width="650" alt="Screenshot 2023-12-10 at 10 19 25 PM" src="https://github.com/Project-MONAI/MONAI/assets/8581162/97069466-cbaf-44e0-b7a7-ae9deb8fd7f2"> The Conjugate-Gradient (CG) algorithm is used to solve for the inversion of the linear operator in Line-4 in the algorithm above, where the linear operator is too large to store explicitly as a matrix (such as FFT/IFFT of an image) and invert directly. Instead, we can solve for the linear inversion iteratively as in CG. The SURE loss is applied for Line-6 above. This is a differentiable loss function that can be used to train/giude an operator (e.g. neural network), where the pseudo ground truth is available but the reference ground truth is not. For example, in the MRI reconstruction, the pseudo ground truth is the zero-filled reconstruction and the reference ground truth is the fully sampled reconstruction. The reference ground truth is not available due to the lack of fully sampled. **Reference** [1] Stein, C.M.: Estimation of the mean of a multivariate normal distribution. Annals of Statistics 1981 [[paper link](https://projecteuclid.org/journals/annals-of-statistics/volume-9/issue-6/Estimation-of-the-Mean-of-a-Multivariate-Normal-Distribution/10.1214/aos/1176345632.full)] [2] B. Ozturkler et al. SMRD: SURE-based Robust MRI Reconstruction with Diffusion Models. MICCAI 2023 [[paper link](https://arxiv.org/pdf/2310.01799.pdf)] ### Types of changes <!--- Put an `x` in all the boxes that apply, and remove the not applicable items --> - [x] Non-breaking change (fix or new feature that would not break existing functionality). - [ ] Breaking change (fix or new feature that would cause existing functionality to change). - [x] New tests added to cover the changes. - [x] Integration tests passed locally by running `./runtests.sh -f -u --net --coverage`. - [x] Quick tests passed locally by running `./runtests.sh --quick --unittests --disttests`. - [x] In-line docstrings updated. - [x] Documentation updated, tested `make html` command in the `docs/` folder. --------- Signed-off-by: chaoliu <chaoliu@nvidia.com> Signed-off-by: cxlcl <chaoliucxl@gmail.com> Signed-off-by: chaoliu <chaoliucxl@gmail.com> Signed-off-by: YunLiu <55491388+KumoLiu@users.noreply.github.com> Co-authored-by: pre-commit-ci[bot] <66853113+pre-commit-ci[bot]@users.noreply.github.com> Co-authored-by: YunLiu <55491388+KumoLiu@users.noreply.github.com> Co-authored-by: Eric Kerfoot <17726042+ericspod@users.noreply.github.com> Signed-off-by: Yu0610 <612410030@alum.ccu.edu.tw>
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| # Copyright (c) MONAI Consortium | ||
| # 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. | ||
|
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| from __future__ import annotations | ||
|
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| from typing import Callable, Optional | ||
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| import torch | ||
| import torch.nn as nn | ||
| from torch.nn.modules.loss import _Loss | ||
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| def complex_diff_abs_loss(x: torch.Tensor, y: torch.Tensor) -> torch.Tensor: | ||
| """ | ||
| First compute the difference in the complex domain, | ||
| then get the absolute value and take the mse | ||
| Args: | ||
| x, y - B, 2, H, W real valued tensors representing complex numbers | ||
| or B,1,H,W complex valued tensors | ||
| Returns: | ||
| l2_loss - scalar | ||
| """ | ||
| if not x.is_complex(): | ||
| x = torch.view_as_complex(x.permute(0, 2, 3, 1).contiguous()) | ||
| if not y.is_complex(): | ||
| y = torch.view_as_complex(y.permute(0, 2, 3, 1).contiguous()) | ||
|
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| diff = torch.abs(x - y) | ||
| return nn.functional.mse_loss(diff, torch.zeros_like(diff), reduction="mean") | ||
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| def sure_loss_function( | ||
| operator: Callable, | ||
| x: torch.Tensor, | ||
| y_pseudo_gt: torch.Tensor, | ||
| y_ref: Optional[torch.Tensor] = None, | ||
| eps: Optional[float] = -1.0, | ||
| perturb_noise: Optional[torch.Tensor] = None, | ||
| complex_input: Optional[bool] = False, | ||
| ) -> torch.Tensor: | ||
| """ | ||
| Args: | ||
| operator (function): The operator function that takes in an input | ||
| tensor x and returns an output tensor y. We will use this to compute | ||
| the divergence. More specifically, we will perturb the input x by a | ||
| small amount and compute the divergence between the perturbed output | ||
| and the reference output | ||
| x (torch.Tensor): The input tensor of shape (B, C, H, W) to the | ||
| operator. For complex input, the shape is (B, 2, H, W) aka C=2 real. | ||
| For real input, the shape is (B, 1, H, W) real. | ||
| y_pseudo_gt (torch.Tensor): The pseudo ground truth tensor of shape | ||
| (B, C, H, W) used to compute the L2 loss. For complex input, the shape is | ||
| (B, 2, H, W) aka C=2 real. For real input, the shape is (B, 1, H, W) | ||
| real. | ||
| y_ref (torch.Tensor, optional): The reference output tensor of shape | ||
| (B, C, H, W) used to compute the divergence. Defaults to None. For | ||
| complex input, the shape is (B, 2, H, W) aka C=2 real. For real input, | ||
| the shape is (B, 1, H, W) real. | ||
| eps (float, optional): The perturbation scalar. Set to -1 to set it | ||
| automatically estimated based on y_pseudo_gtk | ||
| perturb_noise (torch.Tensor, optional): The noise vector of shape (B, C, H, W). | ||
| Defaults to None. For complex input, the shape is (B, 2, H, W) aka C=2 real. | ||
| For real input, the shape is (B, 1, H, W) real. | ||
| complex_input(bool, optional): Whether the input is complex or not. | ||
| Defaults to False. | ||
| Returns: | ||
| sure_loss (torch.Tensor): The SURE loss scalar. | ||
| """ | ||
| # perturb input | ||
| if perturb_noise is None: | ||
| perturb_noise = torch.randn_like(x) | ||
| if eps == -1.0: | ||
| eps = float(torch.abs(y_pseudo_gt.max())) / 1000 | ||
| # get y_ref if not provided | ||
| if y_ref is None: | ||
| y_ref = operator(x) | ||
|
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||
| # get perturbed output | ||
| x_perturbed = x + eps * perturb_noise | ||
| y_perturbed = operator(x_perturbed) | ||
| # divergence | ||
| divergence = torch.sum(1.0 / eps * torch.matmul(perturb_noise.permute(0, 1, 3, 2), y_perturbed - y_ref)) # type: ignore | ||
| # l2 loss between y_ref, y_pseudo_gt | ||
| if complex_input: | ||
| l2_loss = complex_diff_abs_loss(y_ref, y_pseudo_gt) | ||
| else: | ||
| # real input | ||
| l2_loss = nn.functional.mse_loss(y_ref, y_pseudo_gt, reduction="mean") | ||
|
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| # sure loss | ||
| sure_loss = l2_loss * divergence / (x.shape[0] * x.shape[2] * x.shape[3]) | ||
| return sure_loss | ||
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| class SURELoss(_Loss): | ||
| """ | ||
| Calculate the Stein's Unbiased Risk Estimator (SURE) loss for a given operator. | ||
| This is a differentiable loss function that can be used to train/guide an | ||
| operator (e.g. neural network), where the pseudo ground truth is available | ||
| but the reference ground truth is not. For example, in the MRI | ||
| reconstruction, the pseudo ground truth is the zero-filled reconstruction | ||
| and the reference ground truth is the fully sampled reconstruction. Often, | ||
| the reference ground truth is not available due to the lack of fully sampled | ||
| data. | ||
| The original SURE loss is proposed in [1]. The SURE loss used for guiding | ||
| the diffusion model based MRI reconstruction is proposed in [2]. | ||
| Reference | ||
| [1] Stein, C.M.: Estimation of the mean of a multivariate normal distribution. Annals of Statistics | ||
| [2] B. Ozturkler et al. SMRD: SURE-based Robust MRI Reconstruction with Diffusion Models. | ||
| (https://arxiv.org/pdf/2310.01799.pdf) | ||
| """ | ||
|
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| def __init__(self, perturb_noise: Optional[torch.Tensor] = None, eps: Optional[float] = None) -> None: | ||
| """ | ||
| Args: | ||
| perturb_noise (torch.Tensor, optional): The noise vector of shape | ||
| (B, C, H, W). Defaults to None. For complex input, the shape is (B, 2, H, W) aka C=2 real. | ||
| For real input, the shape is (B, 1, H, W) real. | ||
| eps (float, optional): The perturbation scalar. Defaults to None. | ||
| """ | ||
| super().__init__() | ||
| self.perturb_noise = perturb_noise | ||
| self.eps = eps | ||
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| def forward( | ||
| self, | ||
| operator: Callable, | ||
| x: torch.Tensor, | ||
| y_pseudo_gt: torch.Tensor, | ||
| y_ref: Optional[torch.Tensor] = None, | ||
| complex_input: Optional[bool] = False, | ||
| ) -> torch.Tensor: | ||
| """ | ||
| Args: | ||
| operator (function): The operator function that takes in an input | ||
| tensor x and returns an output tensor y. We will use this to compute | ||
| the divergence. More specifically, we will perturb the input x by a | ||
| small amount and compute the divergence between the perturbed output | ||
| and the reference output | ||
| x (torch.Tensor): The input tensor of shape (B, C, H, W) to the | ||
| operator. C=1 or 2: For complex input, the shape is (B, 2, H, W) aka | ||
| C=2 real. For real input, the shape is (B, 1, H, W) real. | ||
| y_pseudo_gt (torch.Tensor): The pseudo ground truth tensor of shape | ||
| (B, C, H, W) used to compute the L2 loss. C=1 or 2: For complex | ||
| input, the shape is (B, 2, H, W) aka C=2 real. For real input, the | ||
| shape is (B, 1, H, W) real. | ||
| y_ref (torch.Tensor, optional): The reference output tensor of the | ||
| same shape as y_pseudo_gt | ||
| Returns: | ||
| sure_loss (torch.Tensor): The SURE loss scalar. | ||
| """ | ||
|
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||
| # check inputs shapes | ||
| if x.dim() != 4: | ||
| raise ValueError(f"Input tensor x should be 4D, got {x.dim()}.") | ||
| if y_pseudo_gt.dim() != 4: | ||
| raise ValueError(f"Input tensor y_pseudo_gt should be 4D, but got {y_pseudo_gt.dim()}.") | ||
| if y_ref is not None and y_ref.dim() != 4: | ||
| raise ValueError(f"Input tensor y_ref should be 4D, but got {y_ref.dim()}.") | ||
| if x.shape != y_pseudo_gt.shape: | ||
| raise ValueError( | ||
| f"Input tensor x and y_pseudo_gt should have the same shape, but got x shape {x.shape}, " | ||
| f"y_pseudo_gt shape {y_pseudo_gt.shape}." | ||
| ) | ||
| if y_ref is not None and y_pseudo_gt.shape != y_ref.shape: | ||
| raise ValueError( | ||
| f"Input tensor y_pseudo_gt and y_ref should have the same shape, but got y_pseudo_gt shape {y_pseudo_gt.shape}, " | ||
| f"y_ref shape {y_ref.shape}." | ||
| ) | ||
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| # compute loss | ||
| loss = sure_loss_function(operator, x, y_pseudo_gt, y_ref, self.eps, self.perturb_noise, complex_input) | ||
|
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| return loss |
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| Original file line number | Diff line number | Diff line change |
|---|---|---|
| @@ -0,0 +1,112 @@ | ||
| # Copyright (c) MONAI Consortium | ||
| # 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. | ||
|
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||
| from __future__ import annotations | ||
|
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| from typing import Callable | ||
|
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| import torch | ||
| from torch import nn | ||
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| def _zdot(x1: torch.Tensor, x2: torch.Tensor) -> torch.Tensor: | ||
| """ | ||
| Complex dot product between tensors x1 and x2: sum(x1.*x2) | ||
| """ | ||
| if torch.is_complex(x1): | ||
| assert torch.is_complex(x2), "x1 and x2 must both be complex" | ||
| return torch.sum(x1.conj() * x2) | ||
| else: | ||
| return torch.sum(x1 * x2) | ||
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| def _zdot_single(x: torch.Tensor) -> torch.Tensor: | ||
| """ | ||
| Complex dot product between tensor x and itself | ||
| """ | ||
| res = _zdot(x, x) | ||
| if torch.is_complex(res): | ||
| return res.real | ||
| else: | ||
| return res | ||
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| class ConjugateGradient(nn.Module): | ||
| """ | ||
| Congugate Gradient (CG) solver for linear systems Ax = y. | ||
| For linear_op that is positive definite and self-adjoint, CG is | ||
| guaranteed to converge CG is often used to solve linear systems of the form | ||
| Ax = y, where A is too large to store explicitly, but can be computed via a | ||
| linear operator. | ||
| As a result, here we won't set A explicitly as a matrix, but rather as a | ||
| linear operator. For example, A could be a FFT/IFFT operation | ||
| """ | ||
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| def __init__(self, linear_op: Callable, num_iter: int): | ||
| """ | ||
| Args: | ||
| linear_op: Linear operator | ||
| num_iter: Number of iterations to run CG | ||
| """ | ||
| super().__init__() | ||
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| self.linear_op = linear_op | ||
| self.num_iter = num_iter | ||
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| def update( | ||
| self, x: torch.Tensor, p: torch.Tensor, r: torch.Tensor, rsold: torch.Tensor | ||
| ) -> tuple[torch.Tensor, torch.Tensor, torch.Tensor, torch.Tensor]: | ||
| """ | ||
| perform one iteration of the CG method. It takes the current solution x, | ||
| the current search direction p, the current residual r, and the old | ||
| residual norm rsold as inputs. Then it computes the new solution, search | ||
| direction, residual, and residual norm, and returns them. | ||
| """ | ||
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| dy = self.linear_op(p) | ||
| p_dot_dy = _zdot(p, dy) | ||
| alpha = rsold / p_dot_dy | ||
| x = x + alpha * p | ||
| r = r - alpha * dy | ||
| rsnew = _zdot_single(r) | ||
| beta = rsnew / rsold | ||
| rsold = rsnew | ||
| p = beta * p + r | ||
| return x, p, r, rsold | ||
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| def forward(self, x: torch.Tensor, y: torch.Tensor) -> torch.Tensor: | ||
| """ | ||
| run conjugate gradient for num_iter iterations to solve Ax = y | ||
| Args: | ||
| x: tensor (real or complex); Initial guess for linear system Ax = y. | ||
| The size of x should be applicable to the linear operator. For | ||
| example, if the linear operator is FFT, then x is HCHW; if the | ||
| linear operator is a matrix multiplication, then x is a vector | ||
| y: tensor (real or complex); Measurement. Same size as x | ||
| Returns: | ||
| x: Solution to Ax = y | ||
| """ | ||
| # Compute residual | ||
| r = y - self.linear_op(x) | ||
| rsold = _zdot_single(r) | ||
| p = r | ||
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| # Update | ||
| for _i in range(self.num_iter): | ||
| x, p, r, rsold = self.update(x, p, r, rsold) | ||
| if rsold < 1e-10: | ||
| break | ||
| return x |
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