Lploc positivity preservation and Liouville-type theorems

Abstract

On a complete Riemannian manifold (M,g), we consider Lploc distributional solutions of the the differential inequality - u + λ u ≥ 0 with λ >0 a locally bounded function that may decay to 0 at infinity. Under suitable growth conditions on the Lp norm of u over geodesic balls, we obtain that any such solution must be nonnegative. This is a kind of generalized Lp-preservation property that can be read as a Liouville type property for nonnegative subsolutiuons of the equation u ≥ λ u. An application of the analytic results to Lp growth estimates of the extrinsic distance of complete minimal submanifolds is also given.