Lp-interpolation inequalities and global Sobolev regularity results (with an appendix by Ognjen Milatovic)

Abstract

On any complete Riemannian manifold M and for all p∈ [2,∞), we prove a family of second order Lp-interpolation inequalities that arise from the following simple Lp-estimate valid for every u ∈ C∞(M): \|∇ u\|pp ≤ \|u p u\|1∈ [0,∞], where p denotes the p-Laplace operator. We show that these inequalities, in combination with abstract functional analytic arguments, allow to establish new global Sobolev regularity results for Lp-solutions of the Poisson equation for all p∈ (1,∞), and new global Sobolev regularity results for the singular magnetic Schr\"odinger semigroups.