Can one identify two unital JB*-algebras by the metric spaces determined by their sets of unitaries?

Abstract

Let M and N be two unital JB*-algebras and let U (M) and U (N) denote the sets of all unitaries in M and N, respectively. We prove that the following statements are equivalent: (a) M and N are isometrically isomorphic as (complex) Banach spaces; (b) M and N are isometrically isomorphic as real Banach spaces; (c) There exists a surjective isometry : U(M) U(N). We actually establish a more general statement asserting that, under some mild extra conditions, for each surjective isometry :U (M) U (N) we can find a surjective real linear isometry :M N which coincides with on the subset ei Msa. If we assume that M and N are JBW*-algebras, then every surjective isometry :U (M) U (N) admits a (unique) extension to a surjective real linear isometry from M onto N. This is an extension of the Hatori--Moln\'ar theorem to the setting of JB*-algebras.