The Liouville property and Hilbertian compression

Abstract

Lower bound on the equivariant Hilbertian compression exponent α are obtained using random walks. More precisely, if the probability of return of the simple random walk is exp(-nγ) in a Cayley graph then α ≥ (1-γ)/(1+γ). This motivates the study of further relations between return probability, speed, entropy and volume growth. For example, if |Bn| en then the speed is n1/(2-). Under a strong assumption on the off-diagonal decay of the heat kernel, the lower bound on compression improves to α ≥ 1-γ. Using a result from Naor and Peres on compression and the speed of random walks, this yields very promising bounds on speed and implies the Liouville property if γ <1/2.