Numerical analysis for a conservative difference scheme to solve the Schrödinger-Boussinesq equation

Abstract In this paper, we present a finite difference scheme for the solution of an initial-boundary value problem of the Schrodinger–Boussinesq equation. The scheme is fully implicit and conserves two invariable quantities of the system. We investigate the existence of the solution for the scheme, give computational process for the numerical solution and prove convergence of iteration method by which a nonlinear algebra system for unknown V n + 1 is solved. On the basis of a priori estimates for a numerical solution, the uniqueness, convergence and stability for the difference solution is discussed. Numerical experiments verify the accuracy of our method.

[1]  Qianshun Chang,et al.  A Conservative Difference Scheme for the Zakharov Equations , 1994 .

[2]  N. N. Rao Coupled scalar field equations for nonlinear wave modulations in dispersive media , 1996 .

[3]  D. R. Nicholson,et al.  Numerical solution of the Zakharov equations , 1983 .

[4]  R. Glassey Approximate solutions to the Zakharov equations via finite differences , 1992 .

[5]  Anders Wäänänen,et al.  Advanced resource connector middleware for lightweight computational Grids , 2007 .

[6]  Luming Zhang Convergence of a conservative difference scheme for a class of Klein-Gordon-Schrödinger equations in one space dimension , 2005, Appl. Math. Comput..

[7]  Boling Guo,et al.  Existence of the Periodic Solution for the Weakly Damped Schrödinger–Boussinesq Equation , 2001 .

[8]  Boling Guo,et al.  The behavior of attractors for damped Schrödinger-Boussinesq equation , 2001 .

[9]  Guo Boling,et al.  The global solution of initial value problem for nonlinear Schrödinger-Boussinesq equation in 3-dimensions , 1990 .

[10]  Qianshun Chang,et al.  Finite difference method for generalized Zakharov equations , 1995 .

[11]  Yongsheng Li,et al.  Finite Dimensional Global Attractor for Dissipative Schrödinger–Boussinesq Equations , 1997 .

[12]  R. Glassey Convergence of an energy-preserving scheme for the Zakharov equations in one space dimension , 1992 .

[13]  M Panigrahy,et al.  Soliton solutions of a coupled field using the mixing exponential method , 1999 .