Abstract. Starting from a recently developed energetic space-time weak for-mulation of boundary integral equations related to wave propagation prob-lems defined on single and multidomains, a coupling algorithm is presented, which allows a flexible use of finite and boundary element methods as local discretization techniques, in order to efficiently treat unbounded multilayered media. Partial differential equations associated to boundary integral equations will be weakly reformulated by the energetic approach and a particular em-phasis will be given to theoretical and experimental analysis of the stability of the proposed method. 1
We consider two-dimensional interior wave propagation problems with vanishing initial and mixed bou...
Here we consider Dirichlet or Neumann wave propagation for 2D exterior problems reformulated in term...
The aim of the boundary element method (BEM) is the numerical solution of integral equations derived...
Starting from a recently developed energetic space-time weak formulation of boundary integral equati...
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 ...
In this paper, considering a Dirichlet-Neumann problem for 1D wave propagation analysis in layered m...
The energetic boundary element method (BEM) is a discretization technique for the numerical solution...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
The Energetic Boundary Element Method (BEM) is a recent discretization technique for the numerical s...
In this paper we compare two time-domain BEM procedures applied to wave propagation analysis in lay...
We consider 3D interior wave propagation problems with vanishing initial and mixed boundary conditi...
In this work, we will consider a 3D exterior wave propagation Neumann problem reformulated in terms...
AbstractWe consider two-dimensional interior wave propagation problems with vanishing initial and mi...
We consider two-dimensional interior wave propagation problems with vanishing initial and mixed bou...
Here we consider Dirichlet or Neumann wave propagation for 2D exterior problems reformulated in term...
The aim of the boundary element method (BEM) is the numerical solution of integral equations derived...
Starting from a recently developed energetic space-time weak formulation of boundary integral equati...
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 ...
In this paper, considering a Dirichlet-Neumann problem for 1D wave propagation analysis in layered m...
The energetic boundary element method (BEM) is a discretization technique for the numerical solution...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
The Energetic Boundary Element Method (BEM) is a recent discretization technique for the numerical s...
In this paper we compare two time-domain BEM procedures applied to wave propagation analysis in lay...
We consider 3D interior wave propagation problems with vanishing initial and mixed boundary conditi...
In this work, we will consider a 3D exterior wave propagation Neumann problem reformulated in terms...
AbstractWe consider two-dimensional interior wave propagation problems with vanishing initial and mi...
We consider two-dimensional interior wave propagation problems with vanishing initial and mixed bou...
Here we consider Dirichlet or Neumann wave propagation for 2D exterior problems reformulated in term...
The aim of the boundary element method (BEM) is the numerical solution of integral equations derived...