Log-Sobolev inequalities: Different roles of Ric and Hess

Abstract

Let Pt be the diffusion semigroup generated by L:= +∇ V on a complete connected Riemannian manifold with Ric-(σ 2o2+c) for some constants σ, c>0 and o the Riemannian distance to a fixed point. It is shown that Pt is hypercontractive, or the log-Sobolev inequality holds for the associated Dirichlet form, provided - HessVδ holds outside of a compact set for some constant δ >(1+2)σ d-1. This indicates, at least in finite dimensions, that Ric and - HessV play quite different roles for the log-Sobolev inequality to hold. The supercontractivity and the ultracontractivity are also studied.