Identifying JBW*-algebras through their spheres of positive elements

Abstract

Let A and B be JBW*-algebras with projection lattices P (A) and P (B), and let : P (A) P(B) be an order isomorphism. We prove that if A does not contain any type I2 direct summand and preserves points at distance 1, then extends to a Jordan *-isomorphism from A onto B. We also establish that if A and B are two atomic JBW*-algebras of type I2 and : P (A) P(B) preserves points at distance 22, then A is Jordan *-isomorphic to B. Furthermore, if A and B are two general JBW*-algebras such that the type I2 part of A is atomic and is an isometry, we prove the existence of an extension of to a Jordan *-isomorphism from A onto B. We provide a positive answer to Tingley's problem for positive spheres showing that if A and B are JBW*-algebras such that the type I2 part of A is atomic, then every surjective isometry from the set, SA+, of positive norm-one elements of A onto the positive norm-one elements of B extends to a Jordan *-isomorphism from A onto B. We prove a metric characterization of projections in JBW*-algebras as follows: if a is a norm-one positive element in a JBW*-algebra A, then a is a projection if, and only if, it satisfies the double sphere property, that is, \c ∈ SA+ : \|c - b\| = 1 \; for all \; b ∈ SA+ \; with \; \|b - a\| = 1\ = \a\.