Exact chirped solutions for the NLSE having Kudryashov’s law with dual form of generalized non-local nonlinearity

Abstract

This paper devotes to investigating the chirped solutions for the nonlinear Schrödinger equation with Kudryashov’s law with dual form of generalized non-local nonlinearity in optical fibers. By implementing the trial equation method and the complete discriminant system for polynomial method, we obtain nineteen exact chirped solutions, whose types include elliptic function doubly-periodic solutions, solitary wave solutions and singular solutions. After selecting specific parameters, 2D and 3D graphs of several typical solutions are drawn to demonstrate their accurate physical behaviors. These solutions recovered abundant patterns of the chirped wave propagations of the model.