Sharp Lp estimates for Schr\"odinger groups on spaces of homogeneous type

Abstract

We prove an Lp estimate \|e-itL (L)f\|p (1+|t|)s\|f\|p, t∈ R, s=n|12-1p| for the Schr\"odinger group generated by a semibounded, selfadjoint operator L on a metric measure space X of homogeneous type (where n is the doubling dimension of X). The assumptions on L are a mild Lp0 Lp0' smoothing estimate and a mild L2 L2 off--diagonal estimate for the corresponding heat kernel e-tL. The estimate is uniform for varying in bounded sets of S(R), or more generally of a suitable weighted Sobolev space. We also prove, under slightly stronger assumptions on L, that the estimate extends to \|e-itL (θ L)f\|p (1+θ-1|t|)s\|f\|p, θ>0, t∈ R, with uniformity also for θ varying in bounded subsets of (0,+∞). For nonnegative operators uniformity holds for all θ>0.