Discrete logarithmic Sobolev inequalities in Banach spaces

Abstract

Let Cn=\-1,1\n be the discrete hypercube equipped with the uniform probability measure σn. We prove that if (E,\|·\|E) is a Banach space of finite cotype and p∈[1,∞), then every function f:Cn E satisfies the dimension-free vector-valued Lp logarithmic Sobolev inequality \|f-E f\|Lp( L)p/2(E) ≤ Kp(E) ( ∫Cn \| Σi=1n δi ∂i f\|Lp(E)p \, dσn(δ))1/p. The finite cotype assumption is necessary for the conclusion to hold. This estimate is the hypercube counterpart of a result of Ledoux (1988) in Gauss space and the optimal vector-valued version of a deep inequality of Talagrand (1994). As an application, we use such vector-valued Lp logarithmic Sobolev inequalities to derive new lower bounds for the bi-Lipschitz distortion of nonlinear quotients of the Hamming cube into Banach spaces with prescribed Rademacher type.