An extension of Petek-Semrl preserver theorems for Jordan embeddings of structural matrix algebras

Abstract

Let Mn be the algebra of n × n complex matrices and Tn ⊂eq Mn the corresponding upper-triangular subalgebra. In their influential work, Petek and Semrl characterize Jordan automorphisms of Mn and Tn, when n ≥ 3, as (injective in the case of Tn) continuous commutativity and spectrum preserving maps φ : Mn Mn and φ : Tn Tn. Recently, in a joint work with Petek, the authors extended this characterization to the maps φ : A Mn, where A is an arbitrary subalgebra of Mn that contains Tn. In particular, any such map φ is a Jordan embedding and hence of the form φ(X)=TXT-1 or φ(X)=TXtT-1, for some invertible matrix T∈ Mn. In this paper we further extend the aforementioned results in the context of structural matrix algebras (SMAs), i.e. subalgebras A of Mn that contain all diagonal matrices. More precisely, we provide both a necessary and sufficient condition for an SMA A⊂eq Mn such that any injective continuous commutativity and spectrum preserving map φ: A Mn is necessarily a Jordan embedding. In contrast to the previous cases, such maps φ no longer need to be multiplicative/antimultiplicative, nor rank-one preservers.

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