| // Ceres Solver - A fast non-linear least squares minimizer |
| // Copyright 2023 Google Inc. All rights reserved. |
| // http://ceres-solver.org/ |
| // |
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| // modification, are permitted provided that the following conditions are met: |
| // |
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| // this list of conditions and the following disclaimer. |
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| // this list of conditions and the following disclaimer in the documentation |
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| // specific prior written permission. |
| // |
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| // |
| // Author: sameeragarwal@google.com (Sameer Agarwal) |
| |
| #include "ceres/low_rank_inverse_hessian.h" |
| |
| #include <list> |
| |
| #include "absl/log/log.h" |
| #include "ceres/internal/eigen.h" |
| |
| namespace ceres::internal { |
| |
| // The (L)BFGS algorithm explicitly requires that the secant equation: |
| // |
| // B_{k+1} * s_k = y_k |
| // |
| // Is satisfied at each iteration, where B_{k+1} is the approximated |
| // Hessian at the k+1-th iteration, s_k = (x_{k+1} - x_{k}) and |
| // y_k = (grad_{k+1} - grad_{k}). As the approximated Hessian must be |
| // positive definite, this is equivalent to the condition: |
| // |
| // s_k^T * y_k > 0 [s_k^T * B_{k+1} * s_k = s_k^T * y_k > 0] |
| // |
| // This condition would always be satisfied if the function was strictly |
| // convex, alternatively, it is always satisfied provided that a Wolfe line |
| // search is used (even if the function is not strictly convex). See [1] |
| // (p138) for a proof. |
| // |
| // Although Ceres will always use a Wolfe line search when using (L)BFGS, |
| // practical implementation considerations mean that the line search |
| // may return a point that satisfies only the Armijo condition, and thus |
| // could violate the Secant equation. As such, we will only use a step |
| // to update the Hessian approximation if: |
| // |
| // s_k^T * y_k > tolerance |
| // |
| // It is important that tolerance is very small (and >=0), as otherwise we |
| // might skip the update too often and fail to capture important curvature |
| // information in the Hessian. For example going from 1e-10 -> 1e-14 improves |
| // the NIST benchmark score from 43/54 to 53/54. |
| // |
| // [1] Nocedal J., Wright S., Numerical Optimization, 2nd Ed. Springer, 1999. |
| // |
| // TODO(alexs.mac): Consider using Damped BFGS update instead of |
| // skipping update. |
| const double kLBFGSSecantConditionHessianUpdateTolerance = 1e-14; |
| |
| LowRankInverseHessian::LowRankInverseHessian( |
| int num_parameters, |
| int max_num_corrections, |
| bool use_approximate_eigenvalue_scaling) |
| : num_parameters_(num_parameters), |
| max_num_corrections_(max_num_corrections), |
| use_approximate_eigenvalue_scaling_(use_approximate_eigenvalue_scaling), |
| approximate_eigenvalue_scale_(1.0), |
| delta_x_history_(num_parameters, max_num_corrections), |
| delta_gradient_history_(num_parameters, max_num_corrections), |
| delta_x_dot_delta_gradient_(max_num_corrections) {} |
| |
| bool LowRankInverseHessian::Update(const Vector& delta_x, |
| const Vector& delta_gradient) { |
| const double delta_x_dot_delta_gradient = delta_x.dot(delta_gradient); |
| if (delta_x_dot_delta_gradient <= |
| kLBFGSSecantConditionHessianUpdateTolerance) { |
| VLOG(2) << "Skipping L-BFGS Update, delta_x_dot_delta_gradient too " |
| << "small: " << delta_x_dot_delta_gradient |
| << ", tolerance: " << kLBFGSSecantConditionHessianUpdateTolerance |
| << " (Secant condition)."; |
| return false; |
| } |
| |
| int next = indices_.size(); |
| // Once the size of the list reaches max_num_corrections_, simulate |
| // a circular buffer by removing the first element of the list and |
| // making it the next position where the LBFGS history is stored. |
| if (next == max_num_corrections_) { |
| next = indices_.front(); |
| indices_.pop_front(); |
| } |
| |
| indices_.push_back(next); |
| delta_x_history_.col(next) = delta_x; |
| delta_gradient_history_.col(next) = delta_gradient; |
| delta_x_dot_delta_gradient_(next) = delta_x_dot_delta_gradient; |
| approximate_eigenvalue_scale_ = |
| delta_x_dot_delta_gradient / delta_gradient.squaredNorm(); |
| return true; |
| } |
| |
| void LowRankInverseHessian::RightMultiplyAndAccumulate(const double* x_ptr, |
| double* y_ptr) const { |
| ConstVectorRef gradient(x_ptr, num_parameters_); |
| VectorRef search_direction(y_ptr, num_parameters_); |
| |
| search_direction = gradient; |
| |
| const int num_corrections = indices_.size(); |
| Vector alpha(num_corrections); |
| |
| for (auto it = indices_.rbegin(); it != indices_.rend(); ++it) { |
| const double alpha_i = delta_x_history_.col(*it).dot(search_direction) / |
| delta_x_dot_delta_gradient_(*it); |
| search_direction -= alpha_i * delta_gradient_history_.col(*it); |
| alpha(*it) = alpha_i; |
| } |
| |
| if (use_approximate_eigenvalue_scaling_) { |
| // Rescale the initial inverse Hessian approximation (H_0) to be iteratively |
| // updated so that it is of similar 'size' to the true inverse Hessian along |
| // the most recent search direction. As shown in [1]: |
| // |
| // \gamma_k = (delta_gradient_{k-1}' * delta_x_{k-1}) / |
| // (delta_gradient_{k-1}' * delta_gradient_{k-1}) |
| // |
| // Satisfies: |
| // |
| // (1 / \lambda_m) <= \gamma_k <= (1 / \lambda_1) |
| // |
| // Where \lambda_1 & \lambda_m are the smallest and largest eigenvalues of |
| // the true Hessian (not the inverse) along the most recent search direction |
| // respectively. Thus \gamma is an approximate eigenvalue of the true |
| // inverse Hessian, and choosing: H_0 = I * \gamma will yield a starting |
| // point that has a similar scale to the true inverse Hessian. This |
| // technique is widely reported to often improve convergence, however this |
| // is not universally true, particularly if there are errors in the initial |
| // jacobians, or if there are significant differences in the sensitivity |
| // of the problem to the parameters (i.e. the range of the magnitudes of |
| // the components of the gradient is large). |
| // |
| // The original origin of this rescaling trick is somewhat unclear, the |
| // earliest reference appears to be Oren [1], however it is widely discussed |
| // without specific attribution in various texts including [2] (p143/178). |
| // |
| // [1] Oren S.S., Self-scaling variable metric (SSVM) algorithms Part II: |
| // Implementation and experiments, Management Science, |
| // 20(5), 863-874, 1974. |
| // [2] Nocedal J., Wright S., Numerical Optimization, Springer, 1999. |
| search_direction *= approximate_eigenvalue_scale_; |
| |
| VLOG(4) << "Applying approximate_eigenvalue_scale: " |
| << approximate_eigenvalue_scale_ << " to initial inverse Hessian " |
| << "approximation."; |
| } |
| |
| for (const int i : indices_) { |
| const double beta = delta_gradient_history_.col(i).dot(search_direction) / |
| delta_x_dot_delta_gradient_(i); |
| search_direction += delta_x_history_.col(i) * (alpha(i) - beta); |
| } |
| } |
| |
| } // namespace ceres::internal |