Decay estimates for a class of semigroups related to self-adjoint operators on metric measure spaces

Abstract

Assume that (X,d,μ) is a metric space endowed with a non-negative Borel measure μ satisfying the doubling condition and the additional condition that μ(B(x,r)) rn for any x∈ X, \,r>0 and some n≥1. Let L be a non-negative self-adjoint operator on L2(X,μ). We assume that e-tL satisfies a Gaussian upper bound and the Schr\"odinger operator eitL satisfies an L1 L∞ decay estimate of the form equation* \|eitL\|L1 L∞ |t|-n2. equation* Then for a general class of dispersive semigroup eitφ(L), where φ: R+ R is smooth, we establish a similar L1 L∞ decay estimate by a suitable subordination formula connecting it with the Schr\"odinger operator eitL. As applications, we derive new Strichartz estimates for several dispersive equations related to Hermite operators, twisted Laplacians and Laguerre operators.