AbstractThis paper concerns a fundamental solution method (FSM, in abbreviation) applied to a reduced wave problem in the exterior region of a disc. The convergent rate of approximate solutions to the exact one is proven to be asymptotically exponentially decreasing with respect to the number N of collocation points employed in an approximate problem. Using obtained FSM solutions we add two numerical tests: numerical estimate of errors including cases of high wave numbers; and visualization of total waves appeared in the scattering phenomena around a circular obstacle in the cases of κ=50 and κ=100, where κ is a normalized wave number, defined through κ= length of wave number vector × radius of the disc. In the second test, the total waves ...
AbstractConsider a singularly perturbed system[formula]Assume that the system has a sequence of regu...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
Scattering is a physical phenomenon which can be modeled with a boundary value problem for a partial...
AbstractIn this paper, we present a mathematical study of the method of fundamental solutions (MFS) ...
AbstractOur fundamental solution method gives an analytic representation of the approximate solution...
AbstractThis paper concerns error estimates for an approximation method for solving the Dirichlet bo...
AbstractThe aim of the present paper is to establish unique solvability theorems for approximate pro...
The direct numerical simulation of the acoustic wave scattering created by very small obstacles is v...
AbstractClassic scattering from objects of arbitrary shape must generally be treated by numerical me...
The study deals with a one-dimensional wave equation. The work is aimed at development of methods of...
This paper proposes applications of the method of fundamental solutions (MFS) to exterior acoustic r...
AbstractIn the first part of this paper, we prove the decay of local energy for the solutions of the...
Over several decades, electromagnetic scattering from an infinitely thin perfectly conducting circul...
AbstractThis paper discusses numerical experiments of wave front propagation on a flat disk and rela...
A general approach to the solution of pulse scattering by finite obstacles is formulated. The essent...
AbstractConsider a singularly perturbed system[formula]Assume that the system has a sequence of regu...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
Scattering is a physical phenomenon which can be modeled with a boundary value problem for a partial...
AbstractIn this paper, we present a mathematical study of the method of fundamental solutions (MFS) ...
AbstractOur fundamental solution method gives an analytic representation of the approximate solution...
AbstractThis paper concerns error estimates for an approximation method for solving the Dirichlet bo...
AbstractThe aim of the present paper is to establish unique solvability theorems for approximate pro...
The direct numerical simulation of the acoustic wave scattering created by very small obstacles is v...
AbstractClassic scattering from objects of arbitrary shape must generally be treated by numerical me...
The study deals with a one-dimensional wave equation. The work is aimed at development of methods of...
This paper proposes applications of the method of fundamental solutions (MFS) to exterior acoustic r...
AbstractIn the first part of this paper, we prove the decay of local energy for the solutions of the...
Over several decades, electromagnetic scattering from an infinitely thin perfectly conducting circul...
AbstractThis paper discusses numerical experiments of wave front propagation on a flat disk and rela...
A general approach to the solution of pulse scattering by finite obstacles is formulated. The essent...
AbstractConsider a singularly perturbed system[formula]Assume that the system has a sequence of regu...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
Scattering is a physical phenomenon which can be modeled with a boundary value problem for a partial...