Uniform Sobolev Estimates on compact manifolds involving singular potentials

Abstract

We obtain generalizations of the uniform Sobolev inequalities of Kenig, Ruiz and the fourth author KRS for Euclidean spaces and Dos Santos Ferreira, Kenig and Salo DKS for compact Riemannian manifolds involving critically singular potentials V∈ Ln/2. We also obtain the analogous improved quasimode estimates of the the first, third and fourth authors BSS , Hassell and Tacy HassellTacy, the first and fourth author SBLog, and Hickman Hickman as well as analogues of the improved uniform Sobolev estimates of BSSY and Hickman involving such potentials. Additionally, on Sn, we obtain sharp uniform Sobolev inequalities involving such potentials for the optimal range of exponents, which extend the results of S. Huang and the fourth author SHSo. For general Riemannian manifolds we improve the earlier results in BSS by obtaining quasimode estimates for a larger (and optimal) range of exponents under the weaker assumption that V∈ Ln/2.