Estimations of the numerical index of a JB*-triple

Abstract

We prove that every commutative JB*-triple has numerical index one. We also revisit the notion of commutativity in JB*-triples to show that a JBW*-triple M has numerical index one precisely when it is commutative, while e-1≤ n(M) ≤ 2-1 otherwise. Consequently, a JB*-triple E is commutative if and only if n(E*) =1 (equivalently, n(E**) =1). In the general setting we prove that the numerical index of each JB*-triple E admitting a non-commutative element also satisfies e-1≤ n(M) ≤ 2-1, and the same holds when the bidual of E contains a Cartan factor of rank ≥ 2 in its atomic part.