Sharp endpoint Lp estimates for Schr\"odinger groups

Abstract

Let L be a non-negative self-adjoint operator acting on L2(X) where X is a space of homogeneous type with a dimension n. Suppose that the heat operator e-tL satisfies the generalized Gaussian (p0, p'0)-estimates of order m for some 1≤ p0 < 2. In this paper we prove sharp endpoint Lp-Sobolev bound for the Schr\"odinger group eitL, that is for every p∈ (p0, p'0) there exists a constant C=C(n,p)>0 independent of t such that eqnarray* \| (I+L)-seitL f\|p ≤ C(1+|t|)s\|f\|p, \ \ \ t∈ R, \ \ \ s≥ n|1 2-1 p|. eqnarray* As a consequence, the above estimate holds for all 1<p<∞ when the heat kernel of L satisfies a Gaussian upper bound. This extends classical results due to Feffermann and Stein, and Miyachi for the Laplacian on the Euclidean spaces Rn. We also give an application to obtain an endpoint estimate for Lp-boundedness of the Riesz means of the solutions of the Schr\"odinger equations.