Title of article :
Convex functions on compact C∗-convex sets
Author/Authors :
Nikoufar ، Ismail Department of Mathematics - Payame Noor University
Abstract :
It is well known that if a real valued convex function on a compact convex domain contained in the real numbers attains its maximum, then it does so at least at one extreme point of its domain. In this paper, we consider a matrix convex function on a compact and C ∗ -convex set generated by self–adjoint matrices. An important issue is so that this function on a compact and C ∗ -convex domain attains its maximum at a C ∗ -extreme point.
Keywords :
C ∗ , convex set , C∗ , extreme point , convex function , matrix convex function
Journal title :
Wavelets and Linear Algebra
Journal title :
Wavelets and Linear Algebra
