Add to ORKGThe scattering of a wave obeying Helmholtz equation by an elliptic obstacle can be described exactly using series of Mathieu functions. This situation is relevant in optics, quantum mechanics and fluid dynamics. We focus on the case when the wavelength is comparable to the obstacle size, when the most standard approximations fail. The approximations of the radial (or modified) Mathieu functions using WKB method are shown to be especially efficient, in order to precisely evaluate series of such functions. It is illustrated with the numerical computation of the Green function when the wave is scattered by a single slit or a strip (ribbon)
Several recent numerical schemes for high frequency scattering simulations are based on the extracti...
The WKB approximation to the scattering problem is developed without the divergences which usually a...
We describe an implementation technique for boundary element methods that greatly reduces the requir...
This lecture presents a modern approach for the computation of Mathieu functions. These functions fi...
: The aim of this paper is to outline the theory for calculating the angular and radial Mathieu func...
Diffraction of a wave passing through a slot is a fundamental problem that has applications in many ...
The purpose of this paper is to present examples of the application of the Mathieu functions to solv...
The standard form of the Mathieu differential equation is d2ydη2+(a−2qcos2η)y=0 where a and q are re...
The computation of special functions has important implications throughout engineering and the physi...
Rigorous approximation techniques for the scattering of a classical electromagnetic wave by fixed ob...
Mathieu functions are employed in solving a variety of problems in mathematic (al? ) physics. In man...
AbstractClassic scattering from objects of arbitrary shape must generally be treated by numerical me...
Abstract. An efficient and accurate method for solving the two-dimensional Helmholtz equation in dom...
Abstract—This note introduces a new family of wavelets and a multiresolution analysis that exploits ...
Our main aim is the accurate computation of a large number of specified eigenvalues and eigenvectors...
Several recent numerical schemes for high frequency scattering simulations are based on the extracti...
The WKB approximation to the scattering problem is developed without the divergences which usually a...
We describe an implementation technique for boundary element methods that greatly reduces the requir...
This lecture presents a modern approach for the computation of Mathieu functions. These functions fi...
: The aim of this paper is to outline the theory for calculating the angular and radial Mathieu func...
Diffraction of a wave passing through a slot is a fundamental problem that has applications in many ...
The purpose of this paper is to present examples of the application of the Mathieu functions to solv...
The standard form of the Mathieu differential equation is d2ydη2+(a−2qcos2η)y=0 where a and q are re...
The computation of special functions has important implications throughout engineering and the physi...
Rigorous approximation techniques for the scattering of a classical electromagnetic wave by fixed ob...
Mathieu functions are employed in solving a variety of problems in mathematic (al? ) physics. In man...
AbstractClassic scattering from objects of arbitrary shape must generally be treated by numerical me...
Abstract. An efficient and accurate method for solving the two-dimensional Helmholtz equation in dom...
Abstract—This note introduces a new family of wavelets and a multiresolution analysis that exploits ...
Our main aim is the accurate computation of a large number of specified eigenvalues and eigenvectors...
Several recent numerical schemes for high frequency scattering simulations are based on the extracti...
The WKB approximation to the scattering problem is developed without the divergences which usually a...
We describe an implementation technique for boundary element methods that greatly reduces the requir...