In this paper, a generalized finite difference method (GFDM) based on the Peridynamic differential operator (PDDO) is investigated. The weighted moving least square (MLS) procedure involved in the GFDM is replaced by the PDDO. PDDO is capable to recast differentiation operators through an integration procedure which has the following advantages: the method is free of using any particular treatment near sharp gradients and where the solution is governed by a steep variation of field variables; it facilitates the imposition of boundary conditions compared to certain meshless methods as its formulation does not need a symmetric kernel function; it is free of any particular correction function and parameter tunings; the method is easy to implem...
The peridynamic theory provides the capability for improved modeling of progressive failure in mater...
The oldest and most useful technique to approximate the solution of differential equations is the fi...
Peridynamics is widely used as the theoretical basis for numerical studies of fracture evolution, pr...
A meshless generalized finite difference time domain (GFDTD) method is proposed and applied to trans...
This study concerns the construction of numerical solutions to linear/nonlinear ordinary and partial...
This study presents numerical solutions to linear and nonlinear Partial Differential Equations (PDEs...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
We study equations from the area of peridynamics, which is a nonlocal extension of elasticity. The g...
This study presents an application of the PeriDynamic (PD) differential operator to solve free bound...
Wave propagation problems can be modeled by partial differential equations. In this thesis, we study...
This study presents the weak form of peridynamic (PD) governing equations which permit the direct im...
The generalised finite difference method (GFDM) is a mesh-free method for solving partial differenti...
UnrestrictedThis dissertation presents a novel developed semi-analytic mathematic scheme, the finite...
This study presents the application of the peridynamic differential operator (PDDO) on modeling of b...
In this paper we will consider the peridynamic equation of motion which is described by a second ord...
The peridynamic theory provides the capability for improved modeling of progressive failure in mater...
The oldest and most useful technique to approximate the solution of differential equations is the fi...
Peridynamics is widely used as the theoretical basis for numerical studies of fracture evolution, pr...
A meshless generalized finite difference time domain (GFDTD) method is proposed and applied to trans...
This study concerns the construction of numerical solutions to linear/nonlinear ordinary and partial...
This study presents numerical solutions to linear and nonlinear Partial Differential Equations (PDEs...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
We study equations from the area of peridynamics, which is a nonlocal extension of elasticity. The g...
This study presents an application of the PeriDynamic (PD) differential operator to solve free bound...
Wave propagation problems can be modeled by partial differential equations. In this thesis, we study...
This study presents the weak form of peridynamic (PD) governing equations which permit the direct im...
The generalised finite difference method (GFDM) is a mesh-free method for solving partial differenti...
UnrestrictedThis dissertation presents a novel developed semi-analytic mathematic scheme, the finite...
This study presents the application of the peridynamic differential operator (PDDO) on modeling of b...
In this paper we will consider the peridynamic equation of motion which is described by a second ord...
The peridynamic theory provides the capability for improved modeling of progressive failure in mater...
The oldest and most useful technique to approximate the solution of differential equations is the fi...
Peridynamics is widely used as the theoretical basis for numerical studies of fracture evolution, pr...