Maps preserving trace of products of matrices

Abstract

We prove the linearity and injectivity of two maps φ1 and φ2 on certain subsets of Mn that satisfy tr(φ1(A)φ2(B))=tr(AB). We apply it to characterize maps φi:S S (i=1, …, m) satisfying tr (φ1(A1)·s φm(Am))=tr (A1·s Am) in which S is the set of n-by-n general, Hermitian, or symmetric matrices for m 3, or positive definite or diagonal matrices for m 2. The real versions are also given.