Chirped envelope solutions of short pulse propagation in highly nonlinear optical fiber

We consider the optical chirped envelope solutions of propagation of short pulse in highly nonlinear optical fibers, which is modeled by a kind of derivative nonlinear Schrodinger equation. We use the complete discrimination system for polynomial method to give a complete analysis of all chirped envelope solutions, and obtain a series of typical exact chirped patterns which include solitons, periodic solutions and singular solutions in terms of explicit and implicit functions.

Automated summary

In this study, the optical chirped envelope solutions of short pulse propagation in highly nonlinear optical fibers are analyzed using a derivative nonlinear Schrodinger equation. The complete discrimination system for polynomial method is applied to obtain a full analysis of all chirped envelope solutions, resulting in a series of typical exact chirped patterns.