We consider a numerical solution of the initial-boundary value problem for the homogeneous wave equation with the Neumann condition using the retarded double layer potential. For solving an equivalent time-dependent integral equation we combine the Laguerre transform (LT) in the time domain with the boundary elements method. After LT we obtain a sequence of boundary integral equations with the same integral operator and functions in right-hand side which are determined recurrently. An error analysis for the numerical solution in accordance with the parameter of boundary discretization is performed. The proposed approach is demonstrated on the numerical solution of the model problem in unbounded three-dimensional spatial domain
In this work the direct boundary element method is applied to solve transient wave propagation probl...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
A variety of numerical methods are applied to solving the wave equations u_tt = u_xx and u_tt = u_xx...
We consider a numerical solution of the initial-boundary value problem for the homogeneous wave equa...
Boundary-value problems of mathematical physics and engineering can be reformulated in terms of boun...
This book offers a thorough and self-contained exposition of the mathematics of time-domain boundary...
Here we consider Dirichlet or Neumann wave propagation for 2D exterior problems reformulated in term...
In this work, we consider as model problem an exterior 3D wave propagation Neumann problem reformul...
We study certain boundary value problems for the one-dimensional wave equation posed in a time-depen...
Time-dependent problems, that are frequently modelled by hyperbolic partial differential equations, ...
The aim of the present contribution is the analysis of one-dimensional wave propagation problems, r...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
AbstractWe consider an initial value problem for the second-order differential equation with a Diric...
AbstractWe study certain boundary value problems for the one-dimensional wave equation posed in a ti...
In this paper, we consider the boundary integral equation (BIE) methods for solving the exterior Neu...
In this work the direct boundary element method is applied to solve transient wave propagation probl...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
A variety of numerical methods are applied to solving the wave equations u_tt = u_xx and u_tt = u_xx...
We consider a numerical solution of the initial-boundary value problem for the homogeneous wave equa...
Boundary-value problems of mathematical physics and engineering can be reformulated in terms of boun...
This book offers a thorough and self-contained exposition of the mathematics of time-domain boundary...
Here we consider Dirichlet or Neumann wave propagation for 2D exterior problems reformulated in term...
In this work, we consider as model problem an exterior 3D wave propagation Neumann problem reformul...
We study certain boundary value problems for the one-dimensional wave equation posed in a time-depen...
Time-dependent problems, that are frequently modelled by hyperbolic partial differential equations, ...
The aim of the present contribution is the analysis of one-dimensional wave propagation problems, r...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
AbstractWe consider an initial value problem for the second-order differential equation with a Diric...
AbstractWe study certain boundary value problems for the one-dimensional wave equation posed in a ti...
In this paper, we consider the boundary integral equation (BIE) methods for solving the exterior Neu...
In this work the direct boundary element method is applied to solve transient wave propagation probl...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
A variety of numerical methods are applied to solving the wave equations u_tt = u_xx and u_tt = u_xx...