Polya-Szego inequality and Dirichlet p-spectral gap for non-smooth spaces with Ricci curvature bounded below

Abstract

We study decreasing rearrangements of functions defined on (possibly non-smooth) metric measure spaces with Ricci curvature bounded below by K>0 and dimension bounded above by N∈ (1,∞) in a synthetic sense, the so called CD(K,N) spaces. We first establish a Polya-Szego type inequality stating that the W1,p-Sobolev norm decreases under such a rearrangement and apply the result to show sharp spectral gap for the p-Laplace operator with Dirichlet boundary conditions (on open subsets), for every p∈ (1,∞). This extends to the non-smooth setting a classical result of B\'erard-Meyer and Matei; remarkable examples of spaces fitting out framework and for which the results seem new include: measured-Gromov Hausdorff limits of Riemannian manifolds with Ricci≥ K>0, finite dimensional Alexandrov spaces with curvature≥ K>0, Finsler manifolds with Ricci≥ K>0. In the second part of the paper we prove new rigidity and almost rigidity results attached to the aforementioned inequalities, in the framework of RCD(K,N) spaces, which seem original even for smooth Riemannian manifolds with Ricci≥ K>0.