Multiplicative and Jordan multiplicative maps on structural matrix algebras

Abstract

Let Mn denote the algebra of n × n complex matrices and let A⊂eq Mn be an arbitrary structural matrix algebra, i.e. a subalgebra of Mn that contains all diagonal matrices. We consider injective maps φ : A Mn that satisfy the condition φ(X Y) = φ(X) φ(Y), for all X,Y ∈ A, where is either the standard matrix multiplication (X,Y) XY, the Jordan product (X,Y) XY+YX, or the normalized Jordan product (X,Y) 12(XY+YX). We show that all such maps φ are automatically additive if and only if A does not contain a central rank-one idempotent. Moreover, in this case, we fully characterize the form of these maps.

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