M-ideals, yet again: the case of real JB*-triples

Abstract

We prove that a subspace of a real JBW*-triple is an M-summand if and only if it is a weak*-closed triple ideal. As a consequence, M-ideals of real JB*-triples correspond to norm-closed triple ideals. As in the setting of complex JB*-triples, a geometric property is characterized in purely algebraic terms. This is a newfangled treatment of the classical notion of M-ideal in the real setting by a fully new approach due to the unfeasibility of the known arguments in the setting of complex C*-algebras and JB*-triples. The results in this note also provide a full characterization of all M-ideals in real C*-algebras, real JB*-algebras and real TROs.