On principal frequencies and isoperimetric ratios in convex sets

Abstract

On a convex set, we prove that the Poincar\'e-Sobolev constant for functions vanishing at the boundary can be bounded from above by the ratio between the perimeter and a suitable power of the N-dimensional measure. This generalizes an old result by P\'olya. As a consequence, we obtain the sharp Buser's inequality (or reverse Cheeger inequality) for the p-Laplacian on convex sets. This is valid in every dimension and for every 1<p<+∞. We also highlight the appearing of a subtle phenomenon in shape optimization, as the integrability exponent varies.