Sharp Poincar\'e-Hardy and Poincar\'e-Rellich inequalities on the hyperbolic space

Abstract

We study Hardy-type inequalities associated to the quadratic form of the shifted Laplacian - HN-(N-1)2/4 on the hyperbolic space HN, (N-1)2/4 being, as it is well-known, the bottom of the L2-spectrum of - HN. We find the optimal constant in the resulting Poincar\'e-Hardy inequality, which includes a further remainder term which makes it sharp also locally. A related inequality under suitable curvature assumption on more general manifolds is also shown. Similarly, we prove Rellich-type inequalities associated with the shifted Laplacian, in which at least one of the constant involved is again sharp.