Second order Sobolev type inequalities in the hyperbolic spaces

Abstract

We establish several Poincar\'e--Sobolev type inequalities for the Lapalce--Beltrami operator g in the hyperbolic space Hn with n≥ 5. These inequalities could be seen as the improved second order Poincar\'e inequality with remainder terms involving with the sharp Rellich inequality or sharp Sobolev inequality in Hn. The novelty of these inequalities is that it combines both the sharp Poincar\'e inequality and the sharp Rellich inequality or the sharp Sobolev inequality for g in Hn. As a consequence, we obtain the Poincar\'e--Sobolev inequality for the second order GJMS operator P2 in Hn. In dimension 4, we obtain an improvement of the sharp Adams inequality and an Adams inequality with exact growth for radial functions in H4.