Multiple soliton solutions with chiral nonlinear Schrödinger’s equation in (2+1)-dimensions

Abstract

This manuscript scrutinizes the (2+1)-dimensions chiral nonlinear Schrödinger’s equation with constant coefficients by utilizing two creative mix strategies. The creative mix strategies are namely the functional variable method and first integral method. Solution and singular soliton solutions are successfully recovered through integration techniques. The intermittent particular arrangements have been investigated for the side-effect of creative mix strategies. In order to have an assurance of these solutions, the various imperative relations jumped out to provide necessary conditions for integrability. Moreover, the dynamical attributes of the obtained results have been underlined and depicted in terms of 3D and 2D graphical illustrations.