نویسندگان | اکبر محبی |
---|---|
تاریخ انتشار | ۲۰۱۶-۱۱-۰۱ |
رتبه نشریه | علمی - پژوهشی |
نوع نشریه | الکترونیکی |
نمایه نشریه | ISC |
چکیده مقاله
The aim of this paper is to extend the split-step idea for the solution of fractional par- tial differential equations. We consider the multidimensional nonlinear Schr ̈odinger equation with the Riesz space fractional derivative and propose an efficient numerical algorithm to obtain it’s approximate solutions. To this end, we first discretize the Riesz fractional derivative then apply the Crank-Nicolson and a split-step methods to obtain a numerical method for this equation. In the proposed method there is no need to solve the nonlinear system of algebraic equations and the method is conver- gent and unconditionally stable. The proposed method preserves the discrete mass which will be investigated numerically. Numerical results demonstrate the reliability, accuracy and efficiency of the proposed method.