We present a sparse Gauss-Newton solver for accelerated sensitivity analysis with applications to a wide range of equilibrium-constrained optimization problems. Dense Gauss-Newton solvers have shown promising convergence rates for inverse problems, but the cost of assembling and factorizing the associated matrices has so far been a major stumbling block. In this work, we show how the dense Gauss-Newton Hessian can be transformed into an equivalent sparse matrix that can be assembled and factorized much more efficiently. This leads to drastically reduced computation times for many inverse problems, which we demonstrate on a diverse set of examples. We furthermore show links between sensitivity analysis and nonlinear programming approaches ba...
We describe a new package for minimizing an unconstrained nonlinear function where the Hessian is la...
Compressed sensing has motivated the development of numerous sparse approximation algorithms designe...
Algorithms based on the hard thresholding principle have been well studied with sounding theoretical...
The sparse nonlinear programming (SNP) problem has wide applications in signal and image processing,...
Sparsity-constrained optimization has wide applicability in machine learning, statistics, and signal...
Abstract. We describe an enhanced version of the primal-dual interior point algorithm in Lasdon, Plu...
Hard-thresholding-based algorithms have seen various advantages for sparse optimization in controlli...
AbstractA major enterprise in compressed sensing and sparse approximation is the design and analysis...
A major enterprise in compressed sensing and sparse approximation is the design and analysis of comp...
Abstract: "We propose a quasi-Newton algorithm for solving optimization problems with nonlinear equa...
In this paper, we propose new methods to efficiently solve convex optimization problems encountered ...
Based on the idea of maximum determinant positive definite matrix completion, Yamashita proposed a s...
In our paper, we introduce a sparse and symmetric matrix completion quasi-Newton model using automat...
This article proposes an efficient numerical method for solving nonlinear partial differential equat...
Abstract: "We propose a quasi-Newton algorithm for solving large optimization problems with nonlinea...
We describe a new package for minimizing an unconstrained nonlinear function where the Hessian is la...
Compressed sensing has motivated the development of numerous sparse approximation algorithms designe...
Algorithms based on the hard thresholding principle have been well studied with sounding theoretical...
The sparse nonlinear programming (SNP) problem has wide applications in signal and image processing,...
Sparsity-constrained optimization has wide applicability in machine learning, statistics, and signal...
Abstract. We describe an enhanced version of the primal-dual interior point algorithm in Lasdon, Plu...
Hard-thresholding-based algorithms have seen various advantages for sparse optimization in controlli...
AbstractA major enterprise in compressed sensing and sparse approximation is the design and analysis...
A major enterprise in compressed sensing and sparse approximation is the design and analysis of comp...
Abstract: "We propose a quasi-Newton algorithm for solving optimization problems with nonlinear equa...
In this paper, we propose new methods to efficiently solve convex optimization problems encountered ...
Based on the idea of maximum determinant positive definite matrix completion, Yamashita proposed a s...
In our paper, we introduce a sparse and symmetric matrix completion quasi-Newton model using automat...
This article proposes an efficient numerical method for solving nonlinear partial differential equat...
Abstract: "We propose a quasi-Newton algorithm for solving large optimization problems with nonlinea...
We describe a new package for minimizing an unconstrained nonlinear function where the Hessian is la...
Compressed sensing has motivated the development of numerous sparse approximation algorithms designe...
Algorithms based on the hard thresholding principle have been well studied with sounding theoretical...