Cebysev subspaces of JBW*-triples

Abstract

We describe the one-dimensional Cebys\"ev subspaces of a JBW*-triple M, by showing that for a non-zero element x in M, Cx is a Cebys\"ev subspace of M if, and only if, x is a Brown-Pedersen quasi-invertible element in M. We study the Cebys\"ev JBW*-subtriples of a JBW*-triple M. We prove that, for each non-zero Cebys\"ev JBW*-subtriple N of M, then exactly one of the following statements holds: (a) N is a rank one JBW*-triple with dim(N)≥ 2 (i.e. a complex Hilbert space regarded as a type 1 Cartan factor). Moreover, N may be a closed subspace of arbitrary dimension and M may have arbitrary rank; (b) N= C e, where e is a complete tripotent in M; (c) N and M have rank two, but N may have arbitrary dimension; (d) N has rank greater or equal than three and N=M. We also provide new examples of Cebys\"ev subspaces of classic Banach spaces in connection with ternary rings of operators.