Global well-posedness of quadratic and subquadratic half wave Schr\"odinger equations

Abstract

We consider the following p order nonlinear half wave Schr\"odinger equations(i ∂\t+∂\x 2-|D\y|) u=|u|p-1 uon the plane R2 with 1<p≤ 2. This equation is considered as a toy model motivated by the study of solutions to weakly dispersive equations. In particular, the global well-posedness of this equation is a difficult problem due to the anisotropic property of the equation, with one direction corresponding to the half-wave operator, which is not dispersive. In this paper, we prove the global well-posedness of this equation in L\x2 H\ys(R2) H\x1 L\y2(R2)(12≤ s ≤ 1), which is the first global well-posedness result of nonlinear half wave Schr\"odinger equations. With the global well-posedness in the energy space for the focusing equation and the study on the solitary wave in [1], we complete the proof of the stability of the set of ground states. Moreover, we consider the half wave Schr\"odinger equations on R\x×T\y, which can also be called the wave guide Schr\"odinger equations on R\x×T\y. Using a similar approach in the analysis of the Cauchy problem of half wave Schr\"odinger equations on R2, we can also deduce the global well-posedness of p (1<p≤2) order wave guide Schr\"odinger equations in L\x2 H\ys(R×T) H\x1 L\y2(R×T) with 12≤ s ≤ 1. With the global well-posedness in the energy space for the focusing wave guide Schr\"odinger equations and the study on the ground states in [2], we complete the proof of the orbital stability of the ground states with small frequencies.