An optimal decay estimate for the linearized water wave equation in 2D

Abstract

We obtain a decay estimate for solutions to the linear dispersive equation iut-(-)1/4u=0 for (t,x)∈R×R. This corresponds to a factorization of the linearized water wave equation utt+(-)1/2u=0. In particular, by making use of the Littlewood-Paley decomposition and stationary phase estimates, we obtain decay of order |t|-1/2 for solutions corresponding to data u(0)=, assuming only bounds on Hx1(R) and x∂xLx2(R). As another application of these ideas, we give an extension to equations of the form iut-(-)α/2u=0 for a wider range of α.