Abstract:
The nonlinear Schrdinger equation with the effects of third-order by using
Bilinear Hirota method, the analytic solutions of this model are obtained.
According to those solutions, the relevant properties and features of physical
and optical interest are illustrated.. Most of nonlinear Schrdinger equation has
many applications in physical world. Moreover to find the solutions of Hirota
wave third order nonlinear Schrdinger equation are not easily solvable and
hence different solved techniques. Among them, we have considered Solving
Hirota wave for a third order nonlinear Schrdinger equation using Hirota bilinear
method. The Hirota bilinear method was successfully implemented in
solving the stated equations. We have obtained third order solutions . The obtained
results lead to shallow wave kinds. Furthermore, we considered different
parameters to investigate the nature of solutions in using diffirential functions
manner. Finally, the proposed method is a standard, effective and easily computable
for solving solution for nonlinear Schrdinger equation
