A universal Banach space with a K-unconditional basis

Abstract

For a constant K≥ 1 let BK be the class of pairs (X,( en)n∈ω) consisting of a Banach space X and an unconditional Schauder basis ( en)n∈ω for X, having the unconditional basic constant Ku≤ K. Such pairs are called K-based Banach spaces. A based Banach space X is rational if the unit ball of any finite-dimensional subspace spanned by finitely many basic vectors is a polyhedron whose vertices have rational coordinates in the Schauder basis of X. Using the technique of Fra\"iss\'e theory, we construct a rational K-based Banach space ( UK,( en)n∈ω) which is RIK-universal in the sense that each basis preserving isometry f: UK defined on a based subspace of a finite-dimensional rational K-based Banach space A extends to a basis preserving isometry f:A UK of the based Banach space A. We also prove that the K-based Banach space UK is almost FI1-universal in the sense that any base preserving -isometry f: UK defined on a based subspace of a finite-dimensional 1-based Banach space A extends to a base preserving -isometry f:A UK of the based Banach space A. On the other hand, we show that no almost FIK-universal based Banach space exists for K>1. The Banach space UK is isomorphic to the complementably universal Banach space for the class of Banach spaces with an unconditional Schauder basis, constructed by Pe czy\'nski in 1969.