Fast and stable evaluation of the exact absorbing boundary condition for the semi-discrete linear Schrodinger equation in unbounded domains
[摘要] This paper is concerned with the numerical solution of the one-dimensional semi-discrete linear Schrodinger equation in unbounded domains. In order to compute the solution on the domain of physical interest, the artificial boundary method is applied to transform the original unbounded domain problem into an initial boundary value problem on a truncated finite domain. We prove the stability of the truncated semi-discrete problem. Then, a fast algorithm is proposed to approximate the nonlocal absorbing boundary condition. The novelty of this fast algorithm is that the stability of the approximate truncated semi-discrete problem is automatically maintained. In the end, numerical examples are presented to demonstrate the performance of the proposed algorithm. (C) 2017 Elsevier B.V. All rights reserved.
[发布日期] 2017-12-15 [发布机构]
[效力级别] [学科分类]
[关键词] Absorbing boundary condition;Semi-discrete linear Schrodinger equation;Fast algorithm;Stability [时效性]