A Finite Difference Method For One-dimensional Schr(?)dinger Equation On Unbounded Domain

Posted on:2008-09-29

Degree:Master

Type:Thesis

Country:China

Candidate:N R Zou

Full Text:PDF

GTID:2120360218957930

Subject:Computational Mathematics

Abstract/Summary:

PDF Full Text Request

A finite difference scheme is proposed for one-dimensional time-dependent Schr(o|Â¨)dinger equation on unbounded domain. We reduce the original problem into an initial-boundary value problem in finite computational domain by introducing the artificial boundary conditions, and then construct a finite difference scheme. This scheme, by a rigorous analysis, is proved to be unconditionally stable and convergent, its global error order is also obtained.

Keywords/Search Tags:

Schr(o|¨)dinger equation, finite difference method, artificial boundary condition

PDF Full Text Request

Related items

1	Analysis Of Finite Element Scheme For The Time-dependent Schr(?)dinger Equation With Dirichlet Boundary In An Unbounded Strip
2	Artificial Boundary Method And Numerical Solution Of Time Fractional Schr(?)dinger Equation
3	Artificial Boundary Conditions For Klein-Gordon Equation And Schr(o_¨)dinger Equation
4	A Finite Element Method For Schr(?)dinger Equation With Neumann Boundary Conditions In An Unbounded Strip
5	Study On High Order Finite Difference Methods For Schr?dinger Equations
6	Nonreflecting Artificial Boundary Conditions For The Time-dependent Problems
7	Finite Difference Method For Nonlinear Schr (?) Dinger Equation With Positive Quintic Term
8	The Numerical Simulation Of The Linear Schr(?)dinger Equation On Unbounded Domains Based On The Compact Finite Difference Method
9	Numerical Methods For Several Multi-dimensional Nonlinear Schr(?)dinger-Type Equations
10	A High-order Compact Difference Scheme For Nonlinear Schr?dinger Equation