The noncommutative Choquet boundary II: Hyperrigidity

Abstract

A (finite or countably infinite) set G of generators of an abstract C*-algebra A is called hyperrigid if for every faithful representation of A on a Hilbert space A⊂eq B(H) and every sequence of unital completely positive linear maps φ1, φ2,... from B(H) to itself, n∞\|φn(g)-g\|=0, ∀ g∈ G n∞\|φn(a)-a\|=0, ∀ a∈ A. We show that one can determine whether a given set G of generators is hyperrigid by examining the noncommutative Choquet boundary of the operator space spanned by G G*. We present a variety of concrete applications and discuss prospects for further development.