Quasimode, eigenfunction and spectral projection bounds for Schr\"odinger operators on manifolds with critically singular potentials

Abstract

We obtain quasimode, eigenfunction and spectral projection bounds for Schr\"odinger operators, HV=-g+V(x), on compact Riemannian manifolds (M,g) of dimension n2, which extend the results of the third author~sogge88 corresponding to the case where V 0. We are able to handle critically singular potentials and consequently assume that V∈ Ln2(M) and/or V∈ K(M) (the Kato class). Our techniques involve combining arguments for proving quasimode/resolvent estimates for the case where V 0 that go back to the third author sogge88 as well as ones which arose in the work of Kenig, Ruiz and this author~KRS in the study of "uniform Sobolev estimates" in Rn. We also use techniques from more recent developments of several authors concerning variations on the latter theme in the setting of compact manifolds. Using the spectral projection bounds we can prove a number of natural Lp Lp spectral multiplier theorems under the assumption that V∈ Ln2(M) K(M). Moreover, we can also obtain natural analogs of the original Strichartz estimates~Strichartz77 for solutions of (∂t2- +V)u=0. We also are able to obtain analogous results in Rn and state some global problems that seem related to works on absence of embedded eigenvalues for Schr\"odinger operators in Rn (e.g., IonescuJerison, JK, KenigNar, KochTaEV and iRodS.)