Multiplicatively spectrum-preserving and norm-preserving maps between invertible groups of commutative Banach algebras

Abstract

Let A and B be unital semisimple commutative Banach algebras and T a map from the invertible group A-1 onto B-1. Linearity and multiplicativity of the map are not assumed. We consider the hypotheses on T: (1) σ (TfTg)=σ (fg); (2) σπ(TfTg-α) σπ(fg-α) ; (3) r (TfTg-α )=r(fg-α) hold for some non-zero complex number α and for every f, g∈ A-1, where σ (·) (resp. σπ(·)) denotes the (resp. peripheral) spectrum and (·) denotes the spectral radius. Under each of the hypotheses we show representations for T and under additional assumptions we show that T is extended to an algebra isomorphism. In particular, if T is a surjective group homomorphism such that T preserves the spectrum or T is a surjective isometry with respect to the spectral radius, then T is extended to an algebra isomorphism. Similar results holds for maps from A onto B.