An analysis of the finite-difference method for one-dimensional Klein–Gordon equation on unbounded domain

The numerical solution of the one-dimensional nonlinear Klein-Gordon equation on an unbounded domain is studied in this paper. Split local absorbing boundary (SLAB) conditions are obtained by the operator splitting method, then the original problem is reduced to an initial boundary value problem on

A finite-difference scheme is proposed for the one-dimensional time-dependent SchrSdinger equation. We introduce an artificial boundary condition to reduce the originM problem into an initial-boundary value problem in a finite-computational domain, and then construct a finitedifference scheme by the

This paper addresses the theoretical analysis of a fully discrete scheme for the one-dimensional time-dependent Schrödinger equation on unbounded domain. We first reduce the original problem into an initial-boundary value problem in a bounded domain by introducing a transparent boundary condition, t