The pole condition approach for deriving transparent boundary conditions is extended to the time-dependent, two-dimensional case. Nonphysical modes of the solution are identified by the position of poles of the solution's spatial Laplace transform in the complex plane. By requiring the Laplace transform to be analytic on some problem-dependent complex half-plane, these modes can be suppressed. The resulting algorithm computes a finite number of coefficients of a series expansion of the Laplace transform, thereby providing an approximation to the exact boundary condition. The resulting error decays super-algebraically with the number of coefficients, so relatively few additional degrees of freedom are sufficient to reduce the error to the le...
Abstract: We propose artificial boundary conditions for the wave equation considered outsi...
AbstractA transparent boundary condition for the two-dimensional linear Schrödinger equation is cons...
A detailed analysis of absorbing boundary conditions for the linear Schrodinger equation is presente...
A new approach to derive transparent boundary conditions (TBCs) for dispersive wave, Schrödinger, he...
Abstract. The pole condition approach for deriving transparent boundary conditions is ex-tended to t...
A new approach to derive transparent boundary conditions (TBCs) for wave, Schr¨odinger and drift-di...
A new approach to derive transparent boundary conditions (TBCs) for dispersive wave, Schrödinger, he...
Transparent boundary conditions for polygonal two-dimensional domains based on the pole condition ap...
In this review article we discuss different techniques to solve numerically the time-dependent Schrö...
This paper is concerned with transparent boundary conditions (TBCs) for the time-dependent Schröding...
The pole condition is a framework for the derivation of transparent boundary conditions that identif...
Abstract: The preprint is devoted to constructing of Transparent Boundary Conditions (TBC)...
We propose transparent boundary conditions (TBCs) for the time-dependent Schrödinger equation on a c...
This paper is concerned with transparent boundary conditions for the one dimensional time-dependent ...
This paper is concerned with transparent boundary conditions for the one dimensional time–dependent ...
Abstract: We propose artificial boundary conditions for the wave equation considered outsi...
AbstractA transparent boundary condition for the two-dimensional linear Schrödinger equation is cons...
A detailed analysis of absorbing boundary conditions for the linear Schrodinger equation is presente...
A new approach to derive transparent boundary conditions (TBCs) for dispersive wave, Schrödinger, he...
Abstract. The pole condition approach for deriving transparent boundary conditions is ex-tended to t...
A new approach to derive transparent boundary conditions (TBCs) for wave, Schr¨odinger and drift-di...
A new approach to derive transparent boundary conditions (TBCs) for dispersive wave, Schrödinger, he...
Transparent boundary conditions for polygonal two-dimensional domains based on the pole condition ap...
In this review article we discuss different techniques to solve numerically the time-dependent Schrö...
This paper is concerned with transparent boundary conditions (TBCs) for the time-dependent Schröding...
The pole condition is a framework for the derivation of transparent boundary conditions that identif...
Abstract: The preprint is devoted to constructing of Transparent Boundary Conditions (TBC)...
We propose transparent boundary conditions (TBCs) for the time-dependent Schrödinger equation on a c...
This paper is concerned with transparent boundary conditions for the one dimensional time-dependent ...
This paper is concerned with transparent boundary conditions for the one dimensional time–dependent ...
Abstract: We propose artificial boundary conditions for the wave equation considered outsi...
AbstractA transparent boundary condition for the two-dimensional linear Schrödinger equation is cons...
A detailed analysis of absorbing boundary conditions for the linear Schrodinger equation is presente...