AbstractWe find low order approximations to the spherical nonreflecting boundary kernel for the wave equation in three dimensions. First we express the Laplace transform of the kernel as a rational function by solving for the zeros of a modified Bessel function. Then we formulate a linear time-invariant dynamical system whose transfer function is this rational function. Finally we use the Balanced Truncation method to generate low order approximations. We compare our approach with a direct L2 minimization approach where a rational approximation is expressed as the ratio of two polynomials
In this article, an inverse problem with regards to the Laplace equation with non-homogeneous Neuman...
AbstractThe problem of solving pseudodifferential equations on spheres by collocation with zonal ker...
This paper presents a class of approximations to a type of wave field for which the dispersion relat...
International audienceWe find low order approximations to the spherical nonreflecting boundary kerne...
AbstractWe find low order approximations to the spherical nonreflecting boundary kernel for the wave...
Abstract. We present a systematic approach to the computation of exact nonreflecting bound-ary condi...
AbstractTo solve the time-dependent wave equation in an infinite two (three) dimensional domain a ci...
The Laplace equation in the exterior of the unit sphere with a Dirichlet boundary condition arises f...
AbstractTo solve the Helmholtz equation in an infinite three-dimensional domain a spherical artifici...
This paper presents an approximate method for obtaining truncated balance realizations of systems re...
AbstractThe order of convergence for the low frequency asymptotics of exterior boundary value proble...
Non-strongly elliptic pseudodifferential equations on the unit sphere arise from geodesy. An example...
In this article, a semi-analytical method for solving the Laplace problems with circular boundaries ...
AbstractOne-way wave equations (OWWEs), derived from rational approximations, C(s) to 11minus;SS, ar...
this paper, we couple fast nonreflecting boundary conditions, developed in [3] for spherical and cyl...
In this article, an inverse problem with regards to the Laplace equation with non-homogeneous Neuman...
AbstractThe problem of solving pseudodifferential equations on spheres by collocation with zonal ker...
This paper presents a class of approximations to a type of wave field for which the dispersion relat...
International audienceWe find low order approximations to the spherical nonreflecting boundary kerne...
AbstractWe find low order approximations to the spherical nonreflecting boundary kernel for the wave...
Abstract. We present a systematic approach to the computation of exact nonreflecting bound-ary condi...
AbstractTo solve the time-dependent wave equation in an infinite two (three) dimensional domain a ci...
The Laplace equation in the exterior of the unit sphere with a Dirichlet boundary condition arises f...
AbstractTo solve the Helmholtz equation in an infinite three-dimensional domain a spherical artifici...
This paper presents an approximate method for obtaining truncated balance realizations of systems re...
AbstractThe order of convergence for the low frequency asymptotics of exterior boundary value proble...
Non-strongly elliptic pseudodifferential equations on the unit sphere arise from geodesy. An example...
In this article, a semi-analytical method for solving the Laplace problems with circular boundaries ...
AbstractOne-way wave equations (OWWEs), derived from rational approximations, C(s) to 11minus;SS, ar...
this paper, we couple fast nonreflecting boundary conditions, developed in [3] for spherical and cyl...
In this article, an inverse problem with regards to the Laplace equation with non-homogeneous Neuman...
AbstractThe problem of solving pseudodifferential equations on spheres by collocation with zonal ker...
This paper presents a class of approximations to a type of wave field for which the dispersion relat...