AbstractThere has been considerable attention given in recent years to the problem of extending finite and boundary element-based analysis of Helmholtz problems to higher frequencies. One approach is the Partition of Unity Method, which has been applied successfully to boundary integral solutions of Helmholtz problems, providing significant accuracy benefits while simultaneously reducing the required number of degrees of freedom for a given accuracy. These benefits accrue at the cost of the requirement to perform some numerically intensive calculations in order to evaluate boundary integrals of highly oscillatory functions. In this paper we adapt the numerical steepest descent method to evaluate these integrals for two-dimensional problems....
In this article we describe recent progress on the design, analysis and implementation of hybrid num...
The approximation of wave problems, particularly at high frequencies, with the classical finite elem...
summary:In this paper we study the $q$-version of the Partition of Unity Method for the Helmholtz eq...
AbstractThere has been considerable attention given in recent years to the problem of extending fini...
There has been considerable attention given in recent years to the problem of extending finite and b...
In this thesis several aspects of the Partition of Unity Boundary Element Method (PUBEM) are investi...
In this paper, we present a new numerical formulation of solving the boundary integral equations ref...
Use of plane wave basis for the numerical solutions of acoustic wave problems using element based m...
We propose a method for efficient evaluation of surface integrals arising in boundary element metho...
We propose a method for efficient evaluation of surface integrals arising in boundary element method...
We propose a method for efficient evaluation of surface integrals arising in boundary elementmethods...
This thesis is concerned with the numerical solution of boundary integral equations and the numeric...
The boundary element method (BEM) is a popular tool for wave scattering problems. To reduce the numb...
AbstractA Neumann boundary value problem of the Helmholtz equation in the exterior circular domain i...
In the last decade the Partition of Unity Method has become attractive as one approach for extending...
In this article we describe recent progress on the design, analysis and implementation of hybrid num...
The approximation of wave problems, particularly at high frequencies, with the classical finite elem...
summary:In this paper we study the $q$-version of the Partition of Unity Method for the Helmholtz eq...
AbstractThere has been considerable attention given in recent years to the problem of extending fini...
There has been considerable attention given in recent years to the problem of extending finite and b...
In this thesis several aspects of the Partition of Unity Boundary Element Method (PUBEM) are investi...
In this paper, we present a new numerical formulation of solving the boundary integral equations ref...
Use of plane wave basis for the numerical solutions of acoustic wave problems using element based m...
We propose a method for efficient evaluation of surface integrals arising in boundary element metho...
We propose a method for efficient evaluation of surface integrals arising in boundary element method...
We propose a method for efficient evaluation of surface integrals arising in boundary elementmethods...
This thesis is concerned with the numerical solution of boundary integral equations and the numeric...
The boundary element method (BEM) is a popular tool for wave scattering problems. To reduce the numb...
AbstractA Neumann boundary value problem of the Helmholtz equation in the exterior circular domain i...
In the last decade the Partition of Unity Method has become attractive as one approach for extending...
In this article we describe recent progress on the design, analysis and implementation of hybrid num...
The approximation of wave problems, particularly at high frequencies, with the classical finite elem...
summary:In this paper we study the $q$-version of the Partition of Unity Method for the Helmholtz eq...