Remarks on the KLS conjecture and Hardy-type inequalities

Abstract

We generalize the classical Hardy and Faber-Krahn inequalities to arbitrary functions on a convex body ⊂ Rn, not necessarily vanishing on the boundary ∂ . This reduces the study of the Neumann Poincar\'e constant on to that of the cone and Lebesgue measures on ∂ ; these may be bounded via the curvature of ∂ . A second reduction is obtained to the class of harmonic functions on . We also study the relation between the Poincar\'e constant of a log-concave measure μ and its associated K. Ball body Kμ. In particular, we obtain a simple proof of a conjecture of Kannan--Lov\'asz--Simonovits for unit-balls of np, originally due to Sodin and Lataa--Wojtaszczyk.