| |
| import math |
| from typing import Any, List |
| import torch |
| from torch import nn |
| from torch.nn import functional as F |
|
|
| from detectron2.config import CfgNode |
| from detectron2.structures import Instances |
|
|
| from .. import DensePoseConfidenceModelConfig, DensePoseUVConfidenceType |
| from .chart import DensePoseChartLoss |
| from .registry import DENSEPOSE_LOSS_REGISTRY |
| from .utils import BilinearInterpolationHelper, LossDict |
|
|
|
|
| @DENSEPOSE_LOSS_REGISTRY.register() |
| class DensePoseChartWithConfidenceLoss(DensePoseChartLoss): |
| """ """ |
|
|
| def __init__(self, cfg: CfgNode): |
| super().__init__(cfg) |
| self.confidence_model_cfg = DensePoseConfidenceModelConfig.from_cfg(cfg) |
| if self.confidence_model_cfg.uv_confidence.type == DensePoseUVConfidenceType.IID_ISO: |
| self.uv_loss_with_confidences = IIDIsotropicGaussianUVLoss( |
| self.confidence_model_cfg.uv_confidence.epsilon |
| ) |
| elif self.confidence_model_cfg.uv_confidence.type == DensePoseUVConfidenceType.INDEP_ANISO: |
| self.uv_loss_with_confidences = IndepAnisotropicGaussianUVLoss( |
| self.confidence_model_cfg.uv_confidence.epsilon |
| ) |
|
|
| def produce_fake_densepose_losses_uv(self, densepose_predictor_outputs: Any) -> LossDict: |
| """ |
| Overrides fake losses for fine segmentation and U/V coordinates to |
| include computation graphs for additional confidence parameters. |
| These are used when no suitable ground truth data was found in a batch. |
| The loss has a value 0 and is primarily used to construct the computation graph, |
| so that `DistributedDataParallel` has similar graphs on all GPUs and can |
| perform reduction properly. |
| |
| Args: |
| densepose_predictor_outputs: DensePose predictor outputs, an object |
| of a dataclass that is assumed to have the following attributes: |
| * fine_segm - fine segmentation estimates, tensor of shape [N, C, S, S] |
| * u - U coordinate estimates per fine labels, tensor of shape [N, C, S, S] |
| * v - V coordinate estimates per fine labels, tensor of shape [N, C, S, S] |
| Return: |
| dict: str -> tensor: dict of losses with the following entries: |
| * `loss_densepose_U`: has value 0 |
| * `loss_densepose_V`: has value 0 |
| * `loss_densepose_I`: has value 0 |
| """ |
| conf_type = self.confidence_model_cfg.uv_confidence.type |
| if self.confidence_model_cfg.uv_confidence.enabled: |
| loss_uv = ( |
| densepose_predictor_outputs.u.sum() + densepose_predictor_outputs.v.sum() |
| ) * 0 |
| if conf_type == DensePoseUVConfidenceType.IID_ISO: |
| loss_uv += densepose_predictor_outputs.sigma_2.sum() * 0 |
| elif conf_type == DensePoseUVConfidenceType.INDEP_ANISO: |
| loss_uv += ( |
| densepose_predictor_outputs.sigma_2.sum() |
| + densepose_predictor_outputs.kappa_u.sum() |
| + densepose_predictor_outputs.kappa_v.sum() |
| ) * 0 |
| return {"loss_densepose_UV": loss_uv} |
| else: |
| return super().produce_fake_densepose_losses_uv(densepose_predictor_outputs) |
|
|
| def produce_densepose_losses_uv( |
| self, |
| proposals_with_gt: List[Instances], |
| densepose_predictor_outputs: Any, |
| packed_annotations: Any, |
| interpolator: BilinearInterpolationHelper, |
| j_valid_fg: torch.Tensor, |
| ) -> LossDict: |
| conf_type = self.confidence_model_cfg.uv_confidence.type |
| if self.confidence_model_cfg.uv_confidence.enabled: |
| u_gt = packed_annotations.u_gt[j_valid_fg] |
| u_est = interpolator.extract_at_points(densepose_predictor_outputs.u)[j_valid_fg] |
| v_gt = packed_annotations.v_gt[j_valid_fg] |
| v_est = interpolator.extract_at_points(densepose_predictor_outputs.v)[j_valid_fg] |
| sigma_2_est = interpolator.extract_at_points(densepose_predictor_outputs.sigma_2)[ |
| j_valid_fg |
| ] |
| if conf_type == DensePoseUVConfidenceType.IID_ISO: |
| return { |
| "loss_densepose_UV": ( |
| self.uv_loss_with_confidences(u_est, v_est, sigma_2_est, u_gt, v_gt) |
| * self.w_points |
| ) |
| } |
| elif conf_type in [DensePoseUVConfidenceType.INDEP_ANISO]: |
| kappa_u_est = interpolator.extract_at_points(densepose_predictor_outputs.kappa_u)[ |
| j_valid_fg |
| ] |
| kappa_v_est = interpolator.extract_at_points(densepose_predictor_outputs.kappa_v)[ |
| j_valid_fg |
| ] |
| return { |
| "loss_densepose_UV": ( |
| self.uv_loss_with_confidences( |
| u_est, v_est, sigma_2_est, kappa_u_est, kappa_v_est, u_gt, v_gt |
| ) |
| * self.w_points |
| ) |
| } |
| return super().produce_densepose_losses_uv( |
| proposals_with_gt, |
| densepose_predictor_outputs, |
| packed_annotations, |
| interpolator, |
| j_valid_fg, |
| ) |
|
|
|
|
| class IIDIsotropicGaussianUVLoss(nn.Module): |
| """ |
| Loss for the case of iid residuals with isotropic covariance: |
| $Sigma_i = sigma_i^2 I$ |
| The loss (negative log likelihood) is then: |
| $1/2 sum_{i=1}^n (log(2 pi) + 2 log sigma_i^2 + ||delta_i||^2 / sigma_i^2)$, |
| where $delta_i=(u - u', v - v')$ is a 2D vector containing UV coordinates |
| difference between estimated and ground truth UV values |
| For details, see: |
| N. Neverova, D. Novotny, A. Vedaldi "Correlated Uncertainty for Learning |
| Dense Correspondences from Noisy Labels", p. 918--926, in Proc. NIPS 2019 |
| """ |
|
|
| def __init__(self, sigma_lower_bound: float): |
| super(IIDIsotropicGaussianUVLoss, self).__init__() |
| self.sigma_lower_bound = sigma_lower_bound |
| self.log2pi = math.log(2 * math.pi) |
|
|
| def forward( |
| self, |
| u: torch.Tensor, |
| v: torch.Tensor, |
| sigma_u: torch.Tensor, |
| target_u: torch.Tensor, |
| target_v: torch.Tensor, |
| ): |
| |
| |
| |
| sigma2 = F.softplus(sigma_u) + self.sigma_lower_bound |
| |
| |
| delta_t_delta = (u - target_u) ** 2 + (v - target_v) ** 2 |
| |
| loss = 0.5 * (self.log2pi + 2 * torch.log(sigma2) + delta_t_delta / sigma2) |
| return loss.sum() |
|
|
|
|
| class IndepAnisotropicGaussianUVLoss(nn.Module): |
| """ |
| Loss for the case of independent residuals with anisotropic covariances: |
| $Sigma_i = sigma_i^2 I + r_i r_i^T$ |
| The loss (negative log likelihood) is then: |
| $1/2 sum_{i=1}^n (log(2 pi) |
| + log sigma_i^2 (sigma_i^2 + ||r_i||^2) |
| + ||delta_i||^2 / sigma_i^2 |
| - <delta_i, r_i>^2 / (sigma_i^2 * (sigma_i^2 + ||r_i||^2)))$, |
| where $delta_i=(u - u', v - v')$ is a 2D vector containing UV coordinates |
| difference between estimated and ground truth UV values |
| For details, see: |
| N. Neverova, D. Novotny, A. Vedaldi "Correlated Uncertainty for Learning |
| Dense Correspondences from Noisy Labels", p. 918--926, in Proc. NIPS 2019 |
| """ |
|
|
| def __init__(self, sigma_lower_bound: float): |
| super(IndepAnisotropicGaussianUVLoss, self).__init__() |
| self.sigma_lower_bound = sigma_lower_bound |
| self.log2pi = math.log(2 * math.pi) |
|
|
| def forward( |
| self, |
| u: torch.Tensor, |
| v: torch.Tensor, |
| sigma_u: torch.Tensor, |
| kappa_u_est: torch.Tensor, |
| kappa_v_est: torch.Tensor, |
| target_u: torch.Tensor, |
| target_v: torch.Tensor, |
| ): |
| |
| sigma2 = F.softplus(sigma_u) + self.sigma_lower_bound |
| |
| |
| r_sqnorm2 = kappa_u_est**2 + kappa_v_est**2 |
| delta_u = u - target_u |
| delta_v = v - target_v |
| |
| |
| delta_sqnorm = delta_u**2 + delta_v**2 |
| delta_u_r_u = delta_u * kappa_u_est |
| delta_v_r_v = delta_v * kappa_v_est |
| |
| delta_r = delta_u_r_u + delta_v_r_v |
| |
| |
| delta_r_sqnorm = delta_r**2 |
| denom2 = sigma2 * (sigma2 + r_sqnorm2) |
| loss = 0.5 * ( |
| self.log2pi + torch.log(denom2) + delta_sqnorm / sigma2 - delta_r_sqnorm / denom2 |
| ) |
| return loss.sum() |
|
|
