Sharp Lp-entropy inequalities on manifolds

Abstract

In 2003, Del Pino and Dolbeault [14] and Gentil [19] investigated, independently, best constants and extremals associated to Euclidean Lp-entropy inequalities for p > 1. In this work, we present some contributions in the Riemannian context. Namely, let (M,g) be a closed Riemannian manifold of dimension n >= 3. For 1 < p <= 2, we establish the validity of the sharp Riemannian Lp-entropy inequality intM |u|p log(|u|p) dvg <= n/p log ( Aopt intM |Gradg u|p dvg + B ) on all functions u em H1,p(M) such that ||u||Lp(M) = 1 for some constant B. Moreover, we prove that the first best constant Aopt is equal to the corresponding Euclidean one. Our approach is inspired on the Bakry, Coulhon, Ledoux and Sallof-Coste's idea [3] of getting Euclidean entropy inequalities as a limit case of suitable subcritical interpolation inequalities. It is conjectured that the inequality sometimes fails for p > 2.