Peridynamics is a nonlocal theory for dynamic fracture analysis consisting in a second order in time partial integro-differential equation. In this paper, we consider a nonlinear model of peridynamics in a two-dimensional spatial domain. We implement a spectral method for the space discretization based on the Fourier expansion of the solution while we consider the Newmark-β method for the time marching. This computational approach takes advantages from the convolutional form of the peridynamic operator and from the use of the discrete Fourier transform. We show a convergence result for the fully discrete approximation and study the stability of the method applied to the linear peridynamic model. Finally, we perform several numerical tests a...
We propose a peridynamic formulation for a unidirectional fiber-reinforced composite lamina based on...
This study presents numerical solutions to linear and nonlinear Partial Differential Equations (PDEs...
Peridynamics is a continuum reformulation of the classical partial differential equations of motion....
Peridynamics is a nonlocal theory for dynamic fracture analysis consisting in a second order in time...
The peridynamic equation consists in an integro-differential equation of the second order in time wh...
In this paper we will consider the peridynamic equation of motion which is described by a second ord...
This study concerns the construction of numerical solutions to linear/nonlinear ordinary and partial...
Different spatial discretisation methods for solving the peridynamic equation of motion are suggeste...
The classical continuum theory is not capable of predicting failure without an external crack growth...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
Peridynamics is an emerging nonlocal continuum theory which allows governing field equations to be a...
Peridynamics is widely used as the theoretical basis for numerical studies of fracture evolution, pr...
The capability to predict damage and crack evolution by using adequate numerical techniques is becom...
While FE methods are computationally very efficient, they are fraught with issues such as mesh depen...
In order to analyse the deformation response of materials and structures, various continuum mechanic...
We propose a peridynamic formulation for a unidirectional fiber-reinforced composite lamina based on...
This study presents numerical solutions to linear and nonlinear Partial Differential Equations (PDEs...
Peridynamics is a continuum reformulation of the classical partial differential equations of motion....
Peridynamics is a nonlocal theory for dynamic fracture analysis consisting in a second order in time...
The peridynamic equation consists in an integro-differential equation of the second order in time wh...
In this paper we will consider the peridynamic equation of motion which is described by a second ord...
This study concerns the construction of numerical solutions to linear/nonlinear ordinary and partial...
Different spatial discretisation methods for solving the peridynamic equation of motion are suggeste...
The classical continuum theory is not capable of predicting failure without an external crack growth...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
Peridynamics is an emerging nonlocal continuum theory which allows governing field equations to be a...
Peridynamics is widely used as the theoretical basis for numerical studies of fracture evolution, pr...
The capability to predict damage and crack evolution by using adequate numerical techniques is becom...
While FE methods are computationally very efficient, they are fraught with issues such as mesh depen...
In order to analyse the deformation response of materials and structures, various continuum mechanic...
We propose a peridynamic formulation for a unidirectional fiber-reinforced composite lamina based on...
This study presents numerical solutions to linear and nonlinear Partial Differential Equations (PDEs...
Peridynamics is a continuum reformulation of the classical partial differential equations of motion....