Sharp quantitative nonembeddability of the Heisenberg group into superreflexive Banach spaces

Abstract

Let denote the discrete Heisenberg group, equipped with a word metric dW associated to some finite symmetric generating set. We show that if (X,\|·\|) is a p-convex Banach space then for any Lipschitz function f: X there exist x,y∈ with dW(x,y) arbitrarily large and equationeq:comp abs \|f(x)-f(y)\|dW(x,y) ( dW(x,y) dW(x,y))1/p. equation We also show that any embedding into X of a ball of radius R 4 in incurs bi-Lipschitz distortion that grows at least as a constant multiple of equationeq:dist abs ( R R)1/p. equation Both~eq:comp abs and~eq:dist abs are sharp up to the iterated logarithm terms. When X is Hilbert space we obtain a representation-theoretic proof yielding bounds corresponding to~eq:comp abs and~eq:dist abs which are sharp up to a universal constant.