More results on column sufficiency property in Euclidean Jordan algebras

Authors

J. Tao, Loyola University Maryland
I. Jeyaraman, Institute of Mathematical Sciences India
G. Ravindran, Indian Statistical Institute Chennai

Article Type

Research Article

Publication Title

Annals of Operations Research

Abstract

A matrix M∈Rn×n is said to be a column sufficient matrix if the solution set of LCP(M,q) is convex for every q∈Rn. In a recent article, Qin et al. (Optim. Lett. 3:265–276, 2009) studied the concept of column sufficiency property in Euclidean Jordan algebras. In this paper, we make a further study of this concept and prove numerous results relating column sufficiency with the Z and Lypaunov-like properties. We also study this property for some special linear transformations.

First Page

229

Last Page

243

DOI

10.1007/s10479-013-1459-4

Publication Date

8-1-2016

Recommended Citation

Tao, J.; Jeyaraman, I.; and Ravindran, G., "More results on column sufficiency property in Euclidean Jordan algebras" (2016). Journal Articles. 4306.
https://digitalcommons.isical.ac.in/journal-articles/4306