Solutions to the Fifth-Order KP II Equation Scatter

Abstract

The fifth-order KP II equation ∂t u + α ∂x3 u + β ∂x5 u + u ∂x u + ∂x-1 ∂y2u=0 (β<0, α>0) is a nonlinear dispersive equation that models long dispersive waves in two space dimensions. We prove that solutions of the fifth-order KP II equation scatter to solutions of the corresponding linear equation ∂t v + α∂x3 v + β∂x5 v + ∂x-1 ∂y2 v = 0 for small data. Our proof uses builds on Hadac, Herr, and Koch's work (see ArXiv:0708.2011) on the third-order KP II equation.