AbstractThe paper deals with the numerical solution of 2D wave propagation exterior problems including viscous and material damping coefficients and equipped by Neumann boundary condition, hence modeling the hard scattering of damped waves. The differential problem, which includes, besides diffusion, advection and reaction terms, is written as a space–time boundary integral equation (BIE) whose kernel is given by the hypersingular fundamental solution of the 2D damped waves operator. The resulting BIE is solved by a modified Energetic Boundary Element Method, where a suitable kernel treatment is introduced for the evaluation of the discretization linear system matrix entries represented by space–time quadruple integrals with hypersingular k...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
Here we consider exterior Neumann wave propagation problems reformulated in terms of space-time hype...
The analysis of scalar wave propagation in 2D zonewise homogeneous media with vanishing initial and ...
The energetic boundary element method (BEM) is a discretization technique for the numerical solution...
AbstractWe consider two-dimensional interior wave propagation problems with vanishing initial and mi...
In this work, we consider as model problem an exterior 3D wave propagation Neumann problem reformul...
In this work, we will consider a 3D exterior wave propagation Neumann problem reformulated in terms...
The Energetic Boundary Element Method (BEM) is a recent discretization technique for the numerical s...
Time-dependent problems, that are frequently modelled by hyperbolic partial differential equations, ...
In this paper, considering a Dirichlet-Neumann problem for 1D wave propagation analysis in layered m...
We consider two-dimensional interior wave propagation problems with vanishing initial and mixed bou...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
Abstract. Starting from a recently developed energetic space-time weak for-mulation of boundary inte...
In this paper, we consider the boundary integral equation (BIE) methods for solving the exterior Neu...
Starting from a recently developed energetic space-time weak formulation of boundary integral equati...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
Here we consider exterior Neumann wave propagation problems reformulated in terms of space-time hype...
The analysis of scalar wave propagation in 2D zonewise homogeneous media with vanishing initial and ...
The energetic boundary element method (BEM) is a discretization technique for the numerical solution...
AbstractWe consider two-dimensional interior wave propagation problems with vanishing initial and mi...
In this work, we consider as model problem an exterior 3D wave propagation Neumann problem reformul...
In this work, we will consider a 3D exterior wave propagation Neumann problem reformulated in terms...
The Energetic Boundary Element Method (BEM) is a recent discretization technique for the numerical s...
Time-dependent problems, that are frequently modelled by hyperbolic partial differential equations, ...
In this paper, considering a Dirichlet-Neumann problem for 1D wave propagation analysis in layered m...
We consider two-dimensional interior wave propagation problems with vanishing initial and mixed bou...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
Abstract. Starting from a recently developed energetic space-time weak for-mulation of boundary inte...
In this paper, we consider the boundary integral equation (BIE) methods for solving the exterior Neu...
Starting from a recently developed energetic space-time weak formulation of boundary integral equati...
In this paper we consider Dirichlet or Neumann wave propagation problems reformulated in terms of bo...
Here we consider exterior Neumann wave propagation problems reformulated in terms of space-time hype...
The analysis of scalar wave propagation in 2D zonewise homogeneous media with vanishing initial and ...