Reducing a generalized Davey-Stewartson system to a non-local nonlinear Schrodinger equation

Göster/ Aç
Tarih
2009-07-30Yazar
Eden, Osman Alp
Erbay, Saadet
Hacınlıyan, Irma
Metadata
Tüm öğe kaydını gösterÖzet
In the present study, we consider a generalized (2 + 1) Davey-Stewartson (GDS) system consisting of a nonlinear Schrodinger (NLS) type equation for the complex amplitude of a short wave and two asymmetrically coupled linear wave equations for long waves propagating in an infinite elastic medium. We obtain integral representation of solutions to the coupled linear wave equations and reduce the GDS system to a NLS equation with non-local terms. Finally, we present localized solutions to the GDS system, decaying in both spatial coordinates, for a special choice of parameters by using the integral representation of solutions to the coupled linear wave equations.