In this paper we use an enriched approximation space for the efficient and accurate solution of the Helmholtz equation in order to solve problems of wave scattering by polygonal obstacles. This is implemented in both Boundary Element Method (BEM) and Partition of Unity Boundary Element Method (PUBEM) settings. The enrichment draws upon the asymptotic singular behaviour of scattered fields at sharp corners, leading to a choice of fractional order Bessel functions that complement the existing Lagrangian (BEM) or plane wave (PUBEM) approximation spaces. Numerical examples consider configurations of scattering objects, subject to the Neumann ‘sound hard’ boundary conditions, demonstrating that the approach is a suitable choice for both c...
We propose a method for efficient evaluation of surface integrals arising in boundary elementmethods...
We propose a method for efficient evaluation of surface integrals arising in boundary element method...
The famous scientist Hermann von Helmholtz was born 200 years ago. Many complex physical wave phenom...
In this paper we use an enriched approximation space for the efficient and accurate solution of the ...
In this thesis several aspects of the Partition of Unity Boundary Element Method (PUBEM) are investi...
The boundary element method (BEM) is a popular tool for wave scattering problems. To reduce the numb...
Paper presented at the 3rd Strathmore International Mathematics Conference (SIMC 2015), 3 - 7 August...
AbstractWe present an asymptotically derived boundary element method for the Helmholtz equation in e...
An isogeometric boundary element method based on NURBS is used to find solutions to the Helmholtz e...
We propose a boundary element method for problems of time-harmonic acoustic scattering by multiple o...
We propose a method for efficient evaluation of surface integrals arising in boundary element metho...
In this paper, two high-order finite element models are investigated for the solution of two-dimensi...
The Laplace and Helmholtz equations are two of the most important partial differential equations (PD...
AbstractThere has been considerable attention given in recent years to the problem of extending fini...
The approximation of wave problems, particularly at high frequencies, with the classical finite elem...
We propose a method for efficient evaluation of surface integrals arising in boundary elementmethods...
We propose a method for efficient evaluation of surface integrals arising in boundary element method...
The famous scientist Hermann von Helmholtz was born 200 years ago. Many complex physical wave phenom...
In this paper we use an enriched approximation space for the efficient and accurate solution of the ...
In this thesis several aspects of the Partition of Unity Boundary Element Method (PUBEM) are investi...
The boundary element method (BEM) is a popular tool for wave scattering problems. To reduce the numb...
Paper presented at the 3rd Strathmore International Mathematics Conference (SIMC 2015), 3 - 7 August...
AbstractWe present an asymptotically derived boundary element method for the Helmholtz equation in e...
An isogeometric boundary element method based on NURBS is used to find solutions to the Helmholtz e...
We propose a boundary element method for problems of time-harmonic acoustic scattering by multiple o...
We propose a method for efficient evaluation of surface integrals arising in boundary element metho...
In this paper, two high-order finite element models are investigated for the solution of two-dimensi...
The Laplace and Helmholtz equations are two of the most important partial differential equations (PD...
AbstractThere has been considerable attention given in recent years to the problem of extending fini...
The approximation of wave problems, particularly at high frequencies, with the classical finite elem...
We propose a method for efficient evaluation of surface integrals arising in boundary elementmethods...
We propose a method for efficient evaluation of surface integrals arising in boundary element method...
The famous scientist Hermann von Helmholtz was born 200 years ago. Many complex physical wave phenom...