Jordan *-homomorphisms on the spaces of continuous maps taking values in C*-algebras

Abstract

Let A be a unital C*-algebra. We consider Jordan *-homomorphisms on C(X, A) and Jordan *-homomorphisms on Lip(X,A). More precisely, for any unital C*-algebra A, we prove that every Jordan *-homomorphism on C(X, A) and every Jordan *-homomorphism on Lip(X,A) is represented as a weighted composition operator by using the irreducible representations of A. In addition, when A1 and A2 are primitive C*-algebras, we characterize the Jordan *-isomorphisms. These results unify and enrich previous works on algebra *-homomorphisms on C(X, A) and Lip(X,A) for several concrete examples of A.