On Kalton's interlaced graphs and nonlinear embeddings into dual Banach spaces

Abstract

We study the nonlinear embeddability of Banach spaces and the equi-embeddability of the family of Kalton's interlaced graphs ([ N]k,d K)k into dual spaces. Notably, we define and study a modification of Kalton's property Q that we call property Qp (with p ∈ (1,+∞]). We show that if ([ N]k,d K)k equi-coarse Lipschitzly embeds into X*, then the Szlenk index of X is greater than ω, and that this is optimal, i.e., there exists a separable dual space Y* that contains ([ N]k,d K)k equi-Lipschitzly and so that Y has Szlenk index ω2. We prove that c0 does not coarse Lipschitzly embed into a separable dual space by a map with distortion strictly smaller than 32. We also show that neither c0 nor L1 coarsely embeds into a separable dual by a weak-to-weak* sequentially continuous map.