This work is devoted to a convergence and performance study of finite-infinite element discretizations for the Helmholtz equation in exterior domains of arbitrary shape. The proposed approximation applies to arbitrary geometries, combining an emhp/em FE discretization between the object and a surrounding sphere and an {\em hp} Infinite Element (IE) discretization outside the sphere with a spectral-like representation (resulting from the separation of variables) in the "radial" direction. The described approximation is an extension of our earlier work, which was restricted to domains with separable geometry. The numerical experiments are confined to these geometrical configurations: a sphere, a (finite) cylinder, and a cylinder with spherica...
New direct spectral solvers for the 3D Helmholtz equation in a finite cylindrical region are present...
We present a new numerical approach to solve 2D exterior Helmholtz problems defined in unbounded dom...
In this paper elementary boundary integral equations for the Helmholtz equation in the exterior doma...
This work is devoted to a study and summary of different Infinite Element (IE) formulations for Helm...
The theory for coupling of mapped wave infinite elements and special wave finite elements for the so...
This work is devoted to a convergence study of infinite element (IE) discretizations for the Helmhol...
There are two cases of the exterior problems of the Helmholtz equation. If lambda greater than or eq...
In this dissertation two methods for improving the conditioning of infinite element stiffness matric...
AbstractTo solve the Helmholtz equation in an infinite three-dimensional domain a spherical artifici...
The nonoverlapping domain decomposition method, which is based on the natural boundary reduction, is...
Based on the natural boundary reduction, an overlapping domain decomposition method is discussed for...
A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in Rd, d ∈ {1, 2, 3...
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 ...
This paper introduces a class of approximate transparent boundary conditions for the solution of Hel...
New direct spectral solvers for the 3D Helmholtz equation in a finite cylindrical region are present...
We present a new numerical approach to solve 2D exterior Helmholtz problems defined in unbounded dom...
In this paper elementary boundary integral equations for the Helmholtz equation in the exterior doma...
This work is devoted to a study and summary of different Infinite Element (IE) formulations for Helm...
The theory for coupling of mapped wave infinite elements and special wave finite elements for the so...
This work is devoted to a convergence study of infinite element (IE) discretizations for the Helmhol...
There are two cases of the exterior problems of the Helmholtz equation. If lambda greater than or eq...
In this dissertation two methods for improving the conditioning of infinite element stiffness matric...
AbstractTo solve the Helmholtz equation in an infinite three-dimensional domain a spherical artifici...
The nonoverlapping domain decomposition method, which is based on the natural boundary reduction, is...
Based on the natural boundary reduction, an overlapping domain decomposition method is discussed for...
A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in Rd, d ∈ {1, 2, 3...
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 ...
This paper introduces a class of approximate transparent boundary conditions for the solution of Hel...
New direct spectral solvers for the 3D Helmholtz equation in a finite cylindrical region are present...
We present a new numerical approach to solve 2D exterior Helmholtz problems defined in unbounded dom...
In this paper elementary boundary integral equations for the Helmholtz equation in the exterior doma...