Sign Reversing and Matrix Classes

S. M. Guu*

*此作品的通信作者

研究成果: 期刊稿件文章同行評審

1 引文 斯高帕斯(Scopus)

摘要

The concept of sign reversing is a useful tool to characterize certain matrix classes in linear complementarity problems. In this paper, we characterize the sign-reversal set of an arbitrary square matrix Μ in terms of the null spaces of the matrices Ι-Λ+ΛΜ, where Λ is a diagonal matrix such that 0≤Λ≤Ι. These matrices are used to characterize the membership of Μ in the classes P0, P, and the class of column-sufficient matrices. A simple proof of the Gale and Nikaido characterization theorem for the membership in P is presented. We also study the class of diagonally semistable matrices. We prove that this class is contained properly in the class of sufficient matrices. We show that to characterize the diagonally semistable property is equivalent to solving a concave Lagrangian dual problem. For 2 × 2 matrices, there is no duality gap between a primal problem and its Lagrangian problem. Such a primal problem is motivated by the definition of column sufficiency.

原文英語
頁(從 - 到)373-387
頁數15
期刊Journal of Optimization Theory and Applications
89
發行號2
DOIs
出版狀態已出版 - 05 1996
對外發佈

指紋

深入研究「Sign Reversing and Matrix Classes」主題。共同形成了獨特的指紋。

引用此