Peridynamics has been introduced to overcome limitations of classical continuum mechanics. Peridynamic equations of motion are in the form of integro-differential equations and analytical solutions of these equations are limited in the literature. In this study, a new analytical solution methodology for 1-Dimensional peridynamic equation of motion is presented by utilising inverse Fourier Transform. Analytical solutions for both static and dynamic conditions are obtained. Moreover, different boundary conditions including fixedfixed and fixed-free are considered. Several numerical cases are demonstrated to show the capability of the presented methodology and peridynamic results are compared against results obtained from classical continuum m...
Peridynamics is a generalized continuum theory which is developed to account for long range internal...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
This study presents an application of the PeriDynamic (PD) differential operator to solve free bound...
In order to analyse the deformation response of materials and structures, various continuum mechanic...
Different spatial discretisation methods for solving the peridynamic equation of motion are suggeste...
AbstractPeridynamics is a nonlocal theory of continuum mechanics, which was developed by Silling (20...
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...
Peridynamics is a new continuum mechanics formulation. It is especially suitable for predicting crac...
Peridynamics is a non-local continuum theory that formulates problems in terms of integration of int...
This study concerns the construction of numerical solutions to linear/nonlinear ordinary and partial...
The peridynamic theory reformulates the equations of continuum mechanics in terms of integro-differe...
This study presents numerical solutions to linear and nonlinear Partial Differential Equations (PDEs...
The peridynamic equation consists in an integro-differential equation of the second order in time wh...
Peridynamics is an emerging nonlocal continuum theory which allows governing field equations to be a...
Peridynamics is a generalized continuum theory which is developed to account for long range internal...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
This study presents an application of the PeriDynamic (PD) differential operator to solve free bound...
In order to analyse the deformation response of materials and structures, various continuum mechanic...
Different spatial discretisation methods for solving the peridynamic equation of motion are suggeste...
AbstractPeridynamics is a nonlocal theory of continuum mechanics, which was developed by Silling (20...
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...
Peridynamics is a new continuum mechanics formulation. It is especially suitable for predicting crac...
Peridynamics is a non-local continuum theory that formulates problems in terms of integration of int...
This study concerns the construction of numerical solutions to linear/nonlinear ordinary and partial...
The peridynamic theory reformulates the equations of continuum mechanics in terms of integro-differe...
This study presents numerical solutions to linear and nonlinear Partial Differential Equations (PDEs...
The peridynamic equation consists in an integro-differential equation of the second order in time wh...
Peridynamics is an emerging nonlocal continuum theory which allows governing field equations to be a...
Peridynamics is a generalized continuum theory which is developed to account for long range internal...
We derive the static and dynamic Green's functions for one-, two- and three-dimensional infinit...
This study presents an application of the PeriDynamic (PD) differential operator to solve free bound...