English

On Semimonotone Star Matrices and Linear Complementarity Problem

Optimization and Control 2019-09-10 v4

Abstract

In this article, we introduce the class of semimonotone star (E0sE_0^s) matrices. We establish the importance of the class of E0sE_0^s-matrices in the context of complementarity theory. We show that the principal pivot transform of E0sE_0^s-matrix is not necessarily E0sE_0^s in general. However, we prove that E0s~\tilde{E_0^s}-matrices, a subclass of the E0sE_0^s-matrices with some additional conditions, is in E0fE_0^f by showing this class is in P0.P_0. We prove that LCP(q,A)(q, A) can be processable by Lemke's algorithm if AE0s~P0.A\in \tilde{E_0^s}\cap P_0. We find some conditions for which the solution set of LCP(q,A)(q, A) is bounded and stable under the E0s~\tilde{E^s_0}-property. We propose an algorithm based on an interior point method to solve LCP(q,A)(q, A) given AE0s~.A \in \tilde{E^{s}_{0}}.

Keywords

Cite

@article{arxiv.1808.00281,
  title  = {On Semimonotone Star Matrices and Linear Complementarity Problem},
  author = {R. Jana and A. K. Das and S. Sinha},
  journal= {arXiv preprint arXiv:1808.00281},
  year   = {2019}
}
R2 v1 2026-06-23T03:21:29.108Z