Markov convexity and nonembeddability of the Heisenberg group

Abstract

We compute the Markov convexity invariant of the continuous infinite dimensional Heisenberg group H∞ to show that it is Markov 4-convex and cannot be Markov p-convex for any p < 4. As Markov convexity is a biLipschitz invariant and Hilbert space is Markov 2-convex, this gives a different proof of the classical theorem of Pansu and Semmes that the Heisenberg group does not admit a biLipschitz embedding into any Euclidean space. The Markov convexity lower bound will follow from exhibiting an explicit embedding of Laakso graphs Gn into H∞ that has distortion at most C n1/4 n. We use this to show that if X is a Markov p-convex metric space, then balls of the discrete Heisenberg group H(Z) of radius n embed into X with distortion at least some constant multiple of ( n)1p-14 n. Finally, we show that Markov 4-convexity does not give the optimal distortion for embeddings of binary trees Bm into H∞ by showing that the distortion is on the order of m.