Particular solutions to multidimensional PDEs with KdV-type nonlinearity

Abstract

We consider a class of particular solutions to the (2+1)-dimensional nonlinear partial differential equation (PDE) ut +∂x2n ux1 - ux1 u =0 (here n is any integer) reducing it to the ordinary differential equation (ODE). In a simplest case, n=1, the ODE is solvable in terms of elementary functions. Next choice, n=2, yields the cnoidal waves for the special case of Zakharov-Kuznetsov equation. The proposed method is based on the deformation of the characteristic of the equation ut-uux1=0 and might also be useful in study the higher dimensional PDEs with arbitrary linear part and KdV-type nonlinearity (i.e. the nonlinear term is ux1 u).