Polynomial representations of C*-algebras and their applications

Abstract

This is a sequel to our paper on nonlinear completely positive maps and dilation theory for real involutive algebras, where we have reduced all representation classification problems to the passage from a C*-algebra A to its symmetric powers Sn( A), resp., to holomorphic representations of the multiplicative *-semigroup ( A,·). Here we study the correspondence between representations of A and of Sn( A) in detail. As Sn( A) is the fixed point algebra for the natural action of the symmetric group Sn on A n, this is done by relating representations of Sn( A) to those of the crossed product A n Sn in which it is a hereditary subalgebra. For C*-algebras of type I, we obtain a rather complete description of the equivalence classes of the irreducible representations of Sn( A) and we relate this to the Schur--Weyl theory for C*-algebras. Finally we show that if A⊂eq B( H) is a factor of type II or III, then its corresponding multiplicative representation on H n is a factor representation of the same type, unlike the classical case A=B( H).