Fast Solutions to Projective Monotone Linear Complementarity Problems
Abstract
We present a new interior-point potential-reduction algorithm for solving monotone linear complementarity problems (LCPs) that have a particular special structure: their matrix can be decomposed as , where the rank of is , and denotes Euclidean projection onto the nullspace of . We call such LCPs projective. Our algorithm solves a monotone projective LCP to relative accuracy in iterations, with each iteration requiring flops. This complexity compares favorably with interior-point algorithms for general monotone LCPs: these algorithms also require iterations, but each iteration needs to solve an system of linear equations, a much higher cost than our algorithm when . Our algorithm works even though the solution to a projective LCP is not restricted to lie in any low-rank subspace.
Cite
@article{arxiv.1212.6958,
title = {Fast Solutions to Projective Monotone Linear Complementarity Problems},
author = {Geoffrey J. Gordon},
journal= {arXiv preprint arXiv:1212.6958},
year = {2013}
}