A spectral method for nonlinear wave equations

A conservative spectral method is proposed to solve several two-dimensional nonlinear wave equations. The conventional fast Fourier transform is used to approximate the spatial derivatives and a three-level difference scheme with a free parameter θ is to advance the solution in time. Our time discre

Spectral algorithms offer very high spatial resolution for a wide range of nonlinear wave equations on periodic domains, including well-known cases such as the Korteweg-de Vries and nonlinear Schrödinger equations. For the best computational efficiency, one needs also to use high-order methods in ti

We consider the 2+1 and 3+1 scalar wave equations reduced via a helical Killing field, respectively referred to as the 2-dimensional and 3-dimensional helically reduced wave equation (HRWE). The HRWE serves as the fundamental model for the mixed-type PDE arising in the periodic standing wave (PSW) a

Exact traveling wave profiles are here obtained for a general reaction-diffusionconvection equation, a two-phase flow equation, a generalized Harry᎐Dym equa-Ž . tion, a generalized Korteweg᎐de Vries KdV equation, a modified mKdV equation, a branching network model equation, a Nagumo equation, and a