Endpoint maximal and smoothing estimates for Schroedinger equations

Abstract

For α >1 we consider the initial value problem for the dispersive equation i∂t u +(-)α/2 u= 0. We prove an endpoint Lp inequality for the maximal function t∈[0,1]|u(·,t)| with initial values in Lp-Sobolev spaces, for p∈(2+4/(d+1),∞). This strengthens the fixed time estimates due to Fefferman and Stein, and Miyachi. As an essential tool we establish sharp Lp space-time estimates (local in time) for the same range of p.