The present work concerns the approximation of the solution map S associated to the parametric Helmholtz boundary value problem, i.e., the map which associates to each (real) wavenumber belonging to a given interval of interest the corresponding solution of the Helmholtz equation. We introduce a least squares rational Padé-type approximation technique applicable to any meromorphic Hilbert space-valued univariate map, and we prove the uniform convergence of the Padé approximation error on any compact subset of the interval of interest that excludes any pole. This general result is then applied to the Helmholtz solution map S, which is proven to be meromorphic in ℂ, with a pole of order one in every (single or multiple) eigenvalue of the Lapl...
In various engineering applications, the solution of the Helmholtz equation is required over a broad...
We present a wavenumber-explicit convergence analysis of the hp Finite Element Method applied to a c...
In this paper, we derive the convergence for the high-accuracy algorithm in solving the Dirichlet pr...
The present work concerns the approximation of the solution map S associated to the parametric Helmh...
The present work concerns the approximation of the solution map S associated to the parametric Helmh...
The present work deals with rational model order reduction methods based on the single-point Least-S...
In this work, we consider the approximation of Hilbert space-valued meromorphic functions that arise...
A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in Rd, d ∈ {1, 2, 3...
Abstract. A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in Rd, d ...
A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in Rd, d ∈ {1, 2, 3...
submitted for publication to Applied and Computational Harmonic AnalysisWe consider the problem of r...
The Method of Fundamental Solutions (MFS) is a popular tool to solve Laplace and Helmholtz boundary ...
We consider the problem of reconstructing general solutions to the Helmholtz equation ∆u+λ2u = 0, fo...
The Method of Fundamental Solutions (MFS) is a popular tool to solve Laplace and Helmholtz boundary ...
Diese Masterarbeit beschäftigt sich mit einem Algorithmus für parameterabhängige par- tielle Differ...
In various engineering applications, the solution of the Helmholtz equation is required over a broad...
We present a wavenumber-explicit convergence analysis of the hp Finite Element Method applied to a c...
In this paper, we derive the convergence for the high-accuracy algorithm in solving the Dirichlet pr...
The present work concerns the approximation of the solution map S associated to the parametric Helmh...
The present work concerns the approximation of the solution map S associated to the parametric Helmh...
The present work deals with rational model order reduction methods based on the single-point Least-S...
In this work, we consider the approximation of Hilbert space-valued meromorphic functions that arise...
A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in Rd, d ∈ {1, 2, 3...
Abstract. A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in Rd, d ...
A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in Rd, d ∈ {1, 2, 3...
submitted for publication to Applied and Computational Harmonic AnalysisWe consider the problem of r...
The Method of Fundamental Solutions (MFS) is a popular tool to solve Laplace and Helmholtz boundary ...
We consider the problem of reconstructing general solutions to the Helmholtz equation ∆u+λ2u = 0, fo...
The Method of Fundamental Solutions (MFS) is a popular tool to solve Laplace and Helmholtz boundary ...
Diese Masterarbeit beschäftigt sich mit einem Algorithmus für parameterabhängige par- tielle Differ...
In various engineering applications, the solution of the Helmholtz equation is required over a broad...
We present a wavenumber-explicit convergence analysis of the hp Finite Element Method applied to a c...
In this paper, we derive the convergence for the high-accuracy algorithm in solving the Dirichlet pr...