Centered Sobolev inequality and exponential convergence in -entropy

Abstract

In this short paper we find that the Sobolev inequality 1p-2[(∫ fp dμ)2/p - ∫ f2 dμ] C ∫ |∇ f|2 dμ (p 0) is equivalent to the exponential convergence of the Markov diffusion semigroup (Pt) to the invariant measure μ, in some -entropy. We provide the estimate of the exponential convergence in total variation and a bounded perturbation result under the Sobolev inequality. Finally in the one-dimensional case we get some two-sided estimates of the Sobolev constant by means of the generalized Hardy inequality.