On local dispersive and Strichartz estimates for the Grushin operator

Abstract

Let G=--|x|2∂t2 denote the Grushin operator on Rn+1. The aim of this paper is two fold. In the first part, due to the non-dispersive phenomena of the Grushin-Schr\"odinger equation on Rn+1, we establish a local dispersive estimate by defining the Grushin-Schr\"odinger kernel on a suitable domain. As a corollary we obtain a local Strichartz estimate for the Grushin-Schr\"odinger equation. In the next part, we prove a restriction theorem with respect to the scaled Hermite-Fourier transform on Rn+2 for certain surfaces in N0n×R*× R and derive anisotropic Strichartz estimates for the Grushin-Schr\"odinger equation and for the Grushin wave equation as well.