Small data scattering of the inhomogeneous cubic-quintic NLS in 2 dimensions

Abstract

The aim of this paper is to show the small data scattering for 2D ICQNLS: iut=- u + K1(x)|u|2u+K2(x)|u|4u. Under the assumption that | ∂j Kl | |x|bl -j for j=0, 1, 2, l=1, 2 and 0 bl l - 23, we prove the small data scattering in an angularly regular Sobolev space Hθ1,1. We use the decaying property of angularly regular functions, which are defined as functions in Sobolev space Hθ1, 1 ⊂ H1 with angular regularity such that \|∂θ f\|H1 < ∞, and also use the recently developed angularly averaged Strichartz estimates stri2, cholee, ghn. In addition, we suggest a sufficient condition for non-existence of scattering.