Complexition and solitary wave solutions of the (2+1)-dimensional dispersive long wave equations

Document Type: Research articles


1 Radiation Physics Laboratory, Dep. of Physics, Badji Mokhtar University, ALGERIA

2 Department of Mathematical Sciences, Delaware State University, Dover, USA


In this paper, the coupled dispersive (2+1)-dimensional long wave equation is studied. The traveling wave hypothesis yields complexiton solutions. Subsequently, the wave equation is studied with power law nonlinearity where the ansatz method is applied to yield solitary wave solutions. The constraint conditions for the existence of solitons naturally fall out of the derivation of the soliton solution.