International audienceThe aim of this paper is to construct accurate absorbing boundary conditions (ABCs) for the two-dimensional peridynamics equation of motion which describes nonlocal phenomena arising in continuum mechanics based on integrodifferential equations. To this end, a full discretization of the system is used based on a Crank-Nicolson scheme in time and an asymptotically compatible scheme in space. Recursive relations for the Green's functions are then derived and numerically used to evaluate the nonlocal ABCs. In particular, these absorbing boundary conditions solve the corner reflection problem with high precision. The stability of the complete fully discretized scheme is stated and numerical examples are finally reported to...
Peridynamics is a non-local continuum theory that formulates problems in terms of integration of int...
We study nonlocal equations from the area of peridynamics on bounded domains. In our companion paper...
The peridynamic theory is a nonlocal formulation of continuum mechanics based on integro-differentia...
The aim of this paper is to develop numerical analysis for the two-dimensional peridynamics which de...
Diffusion-type problems in (nearly) unbounded domains play important roles in various fields of flui...
In order to analyse the deformation response of materials and structures, various continuum mechanic...
The peridynamic theory reformulates the equations of continuum mechanics in terms of integro-differe...
Peridynamics is a nonlocal continuum theory capable of modeling effectively crack initiation and pro...
This study presents the weak form of peridynamic (PD) governing equations which permit the direct im...
In this paper we will consider the peridynamic equation of motion which is described by a second ord...
This study presents peridynamic field equations for mechanical deformation, thermal diffusion, moist...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
Different spatial discretisation methods for solving the peridynamic equation of motion are suggeste...
Peridynamics is a nonlocal theory for dynamic fracture analysis consisting in a second order in time...
Peridynamics has been introduced to overcome limitations of classical continuum mechanics. Peridynam...
Peridynamics is a non-local continuum theory that formulates problems in terms of integration of int...
We study nonlocal equations from the area of peridynamics on bounded domains. In our companion paper...
The peridynamic theory is a nonlocal formulation of continuum mechanics based on integro-differentia...
The aim of this paper is to develop numerical analysis for the two-dimensional peridynamics which de...
Diffusion-type problems in (nearly) unbounded domains play important roles in various fields of flui...
In order to analyse the deformation response of materials and structures, various continuum mechanic...
The peridynamic theory reformulates the equations of continuum mechanics in terms of integro-differe...
Peridynamics is a nonlocal continuum theory capable of modeling effectively crack initiation and pro...
This study presents the weak form of peridynamic (PD) governing equations which permit the direct im...
In this paper we will consider the peridynamic equation of motion which is described by a second ord...
This study presents peridynamic field equations for mechanical deformation, thermal diffusion, moist...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
Different spatial discretisation methods for solving the peridynamic equation of motion are suggeste...
Peridynamics is a nonlocal theory for dynamic fracture analysis consisting in a second order in time...
Peridynamics has been introduced to overcome limitations of classical continuum mechanics. Peridynam...
Peridynamics is a non-local continuum theory that formulates problems in terms of integration of int...
We study nonlocal equations from the area of peridynamics on bounded domains. In our companion paper...
The peridynamic theory is a nonlocal formulation of continuum mechanics based on integro-differentia...