Banach Spaces from Barriers in High Dimensional Ellentuck Spaces

Abstract

A new hierarchy of Banach spaces Tk(d,θ), k any positive integer, is constructed using barriers in high dimensional Ellentuck spaces DobrinenJSL15 following the classical framework under which a Tsirelson type norm is defined from a barrier in the Ellentuck space Argyros/TodorcevicBK. The following structural properties of these spaces are proved. Each of these spaces contains arbitrarily large copies of ∞n, with the bound constant for all n. For each fixed pair d and θ, the spaces Tk(d,θ), k 1, are p-saturated, forming natural extensions of the p space, where p satisfies dθ=d1/p. Moreover, they form a strict hierarchy over the p space: For any j<k, the space Tj(d,θ) embeds isometrically into Tk(d,θ) as a subspace which is non-isomorphic to Tk(d,θ).