New entire positive solution for the nonlinear Schrodinger equation: Coexistence of fronts and bumps

Abstract

In this paper we construct a new kind of positive solutions of u-u+up=0 on 2 when p> 2. These solutions u(x,z) (x-f(z))+ Σi=1∞0((x, z)-ie1) as L→ +∞ where is a unique positive homoclinic solution of "-+p=0 in ; 0 is the two dimensional positive solution and e1= (1, 0) and j are points such that j= jL+ O(1) for all j≥ 1. This represents a first result on the coexistence of fronts and bumps. Geometrically, our new solutions correspond to triunduloid in the theory of CMC surface.