Low rank compact operators and Tingley's problem

Abstract

Let E and B be arbitrary weakly compact JB*-triples whose unit spheres are denoted by S(E) and S(B), respectively. We prove that every surjective isometry f: S(E) S(B) admits an extension to a surjective real linear isometry T: E B. This is a complete solution to Tingley's problem in the setting of weakly compact JB*-triples. Among the consequences, we show that if K(H,K) denotes the space of compact operators between arbitrary complex Hilbert spaces H and K, then every surjective isometry f: S(K(H,K)) S(K(H,K)) admits an extension to a surjective real linear isometry T: K(H,K) K(H,K).