In this paper, we present the Abramov approach for the numerical simulation of the whispering gallery modes in prolate spheroids. The main idea of this approach is the Newton–Raphson technique combined with the quasi-time marching. In the first step, a solution of a simpler problem, as an initial guess for the Newton–Raphson iterations, is provided. Then, step-by-step, this simpler problem is converted into the original problem, while the quasi-time parameter runs from 0 to 1. While following the involved imaginary path two numerical approaches are realized, the first is based on the Prüfer angle technique, the second on high order finite difference schemes
We examine the merits of using prolate spheroidal wave functions (PSWFs) as basis functions when sol...
We introduce a family of generalized prolate spheroidal wave functions (PSWFs) of order -1, and dev...
In this paper, we show how Prolate Spheroidal Wave Functions (PSWFs) can be reliably and accurately ...
In this paper, we present the Abramov approach for the numerical simulation of the whispering galler...
In this paper, we discuss the progress in the numerical simulation of the so-called `whispering gall...
The method presented and studied in [1, 2] for solving self-adjoint multiparameter spectral problems...
Using quasiclassical approach rather precise analytical approximations for the eigenfrequencies of w...
A new method to overcome some limitations in the simulation of the propagation of waves originating ...
AbstractIn this paper, we describe different methods of computing the eigenvalues associated with th...
A new method to overcome some limitations in the simulation of the propagation of waves originating ...
This paper presents the use of the Exodus method to compute the potential distribution in a conducti...
A fast and simple finite difference algorithm for computing the spheroidal wave functions is describ...
The phase-screen (split-step) method is widely used for the modeling of wave propagation in inhomoge...
In this paper we present an efficient Matlab computation of a 3-D electromagnetic scattering problem...
We propose a numerical method to compute the inertial modes of a container with nearspherical geomet...
We examine the merits of using prolate spheroidal wave functions (PSWFs) as basis functions when sol...
We introduce a family of generalized prolate spheroidal wave functions (PSWFs) of order -1, and dev...
In this paper, we show how Prolate Spheroidal Wave Functions (PSWFs) can be reliably and accurately ...
In this paper, we present the Abramov approach for the numerical simulation of the whispering galler...
In this paper, we discuss the progress in the numerical simulation of the so-called `whispering gall...
The method presented and studied in [1, 2] for solving self-adjoint multiparameter spectral problems...
Using quasiclassical approach rather precise analytical approximations for the eigenfrequencies of w...
A new method to overcome some limitations in the simulation of the propagation of waves originating ...
AbstractIn this paper, we describe different methods of computing the eigenvalues associated with th...
A new method to overcome some limitations in the simulation of the propagation of waves originating ...
This paper presents the use of the Exodus method to compute the potential distribution in a conducti...
A fast and simple finite difference algorithm for computing the spheroidal wave functions is describ...
The phase-screen (split-step) method is widely used for the modeling of wave propagation in inhomoge...
In this paper we present an efficient Matlab computation of a 3-D electromagnetic scattering problem...
We propose a numerical method to compute the inertial modes of a container with nearspherical geomet...
We examine the merits of using prolate spheroidal wave functions (PSWFs) as basis functions when sol...
We introduce a family of generalized prolate spheroidal wave functions (PSWFs) of order -1, and dev...
In this paper, we show how Prolate Spheroidal Wave Functions (PSWFs) can be reliably and accurately ...