C-extreme points of unital completely positive maps invariant under group action

Abstract

In this work, we study a sub-collection of unital completely positive maps from a unital C-algebra A to B(H), the algebra of bounded linear operators on a Hilbert space H in the setting of C-convexity. Let τ be an action of a group G on the C-algebra A through C-automorphisms. We focus our attention to the set of all unital completely positive maps from A to B(H), which remain invariant under τ. We denote this collection by the notation UCPGτ (A, B (H ) ). This collection forms a C-convex set. We characterize the set of C-extreme points of UCPGτ (A, B (H ) ). Further, we conclude the article by proving the Krein--Milman type theorem in the setting of C-convexity for the set UCPGτ (A, B (H ) ).