On Solving L-SR1 Trust-Region Subproblems
Abstract
In this article, we consider solvers for large-scale trust-region subproblems when the quadratic model is defined by a limited-memory symmetric rank-one (L-SR1) quasi-Newton matrix. We propose a solver that exploits the compact representation of L-SR1 matrices. Our approach makes use of both an orthonormal basis for the eigenspace of the L-SR1 matrix and the Sherman-Morrison-Woodbury formula to compute global solutions to trust-region subproblems. To compute the optimal Lagrange multiplier for the trust-region constraint, we use Newton's method with a judicious initial guess that does not require safeguarding. A crucial property of this solver is that it is able to compute high-accuracy solutions even in the so-called hard case. Additionally, the optimal solution is determined directly by formula, not iteratively. Numerical experiments demonstrate the effectiveness of this solver.
Cite
@article{arxiv.1506.07222,
title = {On Solving L-SR1 Trust-Region Subproblems},
author = {Johannes Brust and Jennifer B. Erway and Roummel F. Marcia},
journal= {arXiv preprint arXiv:1506.07222},
year = {2016}
}
Comments
2015-01