On the linear preservers of Schur matrix functionals

Abstract

Let F be a field and f : Sn → F \0\ be an arbitrary map. The Schur matrix functional associated to f is defined as M ∈ Mn(F) f(M):=Σσ ∈ Sn f(σ) Πj=1n mσ(j),j. Typical examples of such functionals are the determinant (where f is the signature morphism) and the permanent (where f is constant with value 1). Given two such maps f and g, we study the endomorphisms U of the vector space Mn(F) that satisfy g(U(M))=f(M) for all M ∈ Mn(F). In particular, we give a closed form for the linear preservers of the functional f when f is central, and as a special case we extend to an arbitrary field Botta's characterization of the linear preservers of the permanent.