Linear isometries between real JB*-triples and C*-algebras

Abstract

Let T: A B be a (not necessarily surjective) linear isometry between two real JB*-triples. Then for each a∈ A there exists a tripotent ua in the bidual, B'', of B such that enumerate[(a)] \ua,T(\f,g,h\),ua\=\ua,\T(f),T(g),T(h)\,ua\, for all f,g,h in the real JB*-subtriple, Aa, generated by a; The mapping \ua,T(·),ua\ :Aa→ B'' is a linear isometry. enumerate Furthermore, when B is a real C*-algebra, the projection p=pa= ua* ua satisfies that T(·)p :Aa→ B'' is an isometric triple homomorphism. When A and B are real C*-algebras and A is abelian of real type, then there exists a partial isometry u∈ B'' such that the mapping T(·)u*u :A→ B'' is an isometric triple homomorphism. These results generalise, to the real setting, some previous contributions due to C.-H. Chu and N.-C. Wong, and C.-H. Chu and M. Mackey in 2004 and 2005. We give an example of a non-surjective real linear isometry which cannot be complexified to a complex isometry, showing that the results in the real setting can not be derived by a mere complexification argument.