On the geometry of higher order Schreier spaces

Abstract

For each countable ordinal α let Sα be the Schreier set of order α and XSα be the corresponding Schreier space of order α. In this paper we prove several new properties of these spaces. 1) If α is non-zero then XSα possesses the λ-property of R. Aron and R. Lohman and is a (V)-polyhedral spaces in the sense on V. Fonf and L. Vesely. 2) If α is non-zero and 1<p<∞ then the p-convexification XpSα possesses the uniform λ-property of R. Aron and R. Lohman. 3) For each countable ordinal α the space X*Sα has the λ-property. 4) For n∈ N, if U:XSn XSn is an onto linear isometry then Uei = ei for each i ∈ N. Consequently, these spaces are light in the sense of Megrelishvili. The fact that for non-zero α, XSα is (V)-polyhedral and has the λ-property implies that each XSα is an example of space solving a problem of J. Lindenstrauss from 1966. The first example of such a space was given by C. De Bernardi in 2017 using a renorming of c0.