On smoothing estimates for Schr\"odinger equations on product spaces Tm× Rn

Abstract

Let Tm× Rn denote the Laplace-Beltrami operator on the product spaces Tm× Rn. In this article we show that \|eitTm× Rnf\|Lp(Tm× Rn× [0,1]) ≤ C \|f\|Wα,p(Tm×Rn) holds if p≥ 2(m+n+2)/(m+n) and α> (m+2n)(1/2-1/p)-2/p. Furthermore, we apply the 2-decoupling inequalities to establish local Lp-smoothing estimates for the Schr\"odinger operator eitTm×Rn in modulation spaces Mp,qα(Tm×Rn): \|eitTm×Rnf\|Lp(Tm×Rn× [0,1])≤ C \|f\|Mp,qα(Tm×Rn) for some range of α and p, q. The smoothing estimates in Lp-Sobolev and modulation spaces are sharp up to the endpoint regularity, in a certain range of p and q.