Title of article :
HOMOTOPIC APPROXIMATE SOLUTIONS FOR THE GENERAL PERTURBED NONLINEAR SCHRODINGER EQUATION
Author/Authors :
Hong, Baojian Nanjing Institute of Technology - Department of Mathematical and Physical Science, China , Hong, Baojian Jiangsu University - Faculty of Science, China , Lu, Dianchen Jiangsu University - Faculty of Science, China , Yangzheng, Liu Nanjing Institute of Technology - Department of Mathematical and Physical Science, China
Abstract :
In this work, a class of perturbed nonlinear Schrodinger equation is studied by using the homotopy perturbation method. Firstly, we obtain some Jacobi-like elliptic function solutions of the corresponding typical general undisturbed nonlinear Schrodinger equation through the mapping deformation method, and secondly, a homotopic mapping transform is constructed, then the approximate solution with arbitrary degree of accuracy for the perturbed equation is researched, it is pointed out that the series of approximate solution is convergent. Finally, the efficiency and accuracy of the approximate solution is also discussed by using the fixed point theorem.
Keywords :
perturbed nonlinear Schrodinger equation , homotopic mapping , asymptotic method , approximate solution
Journal title :
mathematical and computational applications
Journal title :
mathematical and computational applications
