Markov type and threshold embeddings

Abstract

For two metric spaces X and Y, say that X threshold-embeds into Y if there exist a number K > 0 and a family of Lipschitz maps fτ : X Y : τ > 0 \ such that for every x,y ∈ X, \[ dX(x,y) ≥ τ => dY(fτ(x),fτ(y)) ≥ \|τ\| τ/K \] where \|fτ\| denotes the Lipschitz constant of fτ. We show that if a metric space X threshold-embeds into a Hilbert space, then X has Markov type 2. As a consequence, planar graph metrics and doubling metrics have Markov type 2, answering questions of Naor, Peres, Schramm, and Sheffield. More generally, if a metric space X threshold-embeds into a p-uniformly smooth Banach space, then X has Markov type p. This suggests some non-linear analogs of Kwapien's theorem. For instance, a subset X ⊂eq L1 threshold-embeds into Hilbert space if and only if X has Markov type 2.