Existence of modified wave operators and infinite cascade result for a half wave Schr\"odinger equation on the plane

Abstract

We consider the following half wave Schr\"odinger equation,(i ∂t+∂x 2-|Dy|) U=|U|2 Uon the plane Rx × Ry. We prove the existence of modified wave operators between small decaying solutions to this equation and small decaying solutions to the non chiral cubic Szeg o equation, which is similar to the the existence result of modified wave operators on Rx × Ty obtained by H. Xu [16]. We then combine our modified wave operators result with a recent cascade result [7] for the cubic Szeg o equation by P. G\'erard and A. Pushnitski to deduce that there exists solutions U to the half wave Schr\"odinger equation such that \|U(t)\|Lx2 Hy1 tends to infinity as t when t → +∞. It indicates that the half wave Schr\"odinger equation on the plane is one of the very few dispersive equations admitting global solutions with small and smooth data such that the Hs norms are going to infinity as t tends to infinity.