The energetic boundary element method (BEM) is a discretization technique for the numerical solution of wave propagation problems, introduced and applied in the last decade to scalar wave propagation inside bounded domains or outside bounded obstacles, in 1D, 2D, and 3D space dimension. The differential initial-boundary value problem at hand is converted into a space–time boundary integral equations (BIEs), then written in a weak form through considerations on energy and discretized by a Galerkin approach. The paper will focus on the extension of 2D wave problems of hard scattering by open arcs to the more involved case of damped waves propagation, taking into account both viscous and material damping. Details will be given on the algebraic...
We consider two-dimensional interior wave propagation problems with vanishing initial and mixed bou...
In this work, we consider as model problem an exterior 3D wave propagation Neumann problem reformul...
Starting from a recently developed energetic space–time weak formulation of boundary integral equati...
The Energetic Boundary Element Method (BEM) is a recent discretization technique for the numerical s...
AbstractThe paper deals with the numerical solution of 2D wave propagation exterior problems includi...
Abstract. Starting from a recently developed energetic space-time weak for-mulation of boundary inte...
Starting from a recently developed energetic space-time weak formulation of boundary integral equati...
The analysis of scalar wave propagation in 2D zonewise homogeneous media with vanishing initial and ...
AbstractWe consider two-dimensional interior wave propagation problems with vanishing initial and mi...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
In this paper, considering a Dirichlet-Neumann problem for 1D wave propagation analysis in layered m...
We consider 3D interior wave propagation problems with vanishing initial and mixed boundary conditi...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
In this work, we will consider a 3D exterior wave propagation Neumann problem reformulated in terms...
The aim of the boundary element method (BEM) is the numerical solution of integral equations derived...
We consider two-dimensional interior wave propagation problems with vanishing initial and mixed bou...
In this work, we consider as model problem an exterior 3D wave propagation Neumann problem reformul...
Starting from a recently developed energetic space–time weak formulation of boundary integral equati...
The Energetic Boundary Element Method (BEM) is a recent discretization technique for the numerical s...
AbstractThe paper deals with the numerical solution of 2D wave propagation exterior problems includi...
Abstract. Starting from a recently developed energetic space-time weak for-mulation of boundary inte...
Starting from a recently developed energetic space-time weak formulation of boundary integral equati...
The analysis of scalar wave propagation in 2D zonewise homogeneous media with vanishing initial and ...
AbstractWe consider two-dimensional interior wave propagation problems with vanishing initial and mi...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
In this paper, considering a Dirichlet-Neumann problem for 1D wave propagation analysis in layered m...
We consider 3D interior wave propagation problems with vanishing initial and mixed boundary conditi...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
In this work, we will consider a 3D exterior wave propagation Neumann problem reformulated in terms...
The aim of the boundary element method (BEM) is the numerical solution of integral equations derived...
We consider two-dimensional interior wave propagation problems with vanishing initial and mixed bou...
In this work, we consider as model problem an exterior 3D wave propagation Neumann problem reformul...
Starting from a recently developed energetic space–time weak formulation of boundary integral equati...