Closed Convex Hulls of Unitary Orbits in C*-Algebras of Real Rank Zero

Abstract

In this paper, we study closed convex hulls of unitary orbits in various C*-algebras. For unital C*-algebras with real rank zero and a faithful tracial state determining equivalence of projections, a notion of majorization describes the closed convex hulls of unitary orbits for self-adjoint operators. Other notions of majorization are examined in these C*-algebras. Combining these ideas with the Dixmier property, we demonstrate unital, infinite dimensional C*-algebras of real rank zero and strict comparison of projections with respect to a faithful tracial state must be simple and have a unique tracial state. Also, closed convex hulls of unitary orbits of self-adjoint operators are fully described in unital, simple, purely infinite C*-algebras.