This study presents the derivation of ordinary state-based peridynamic heat conduction equation based on the Lagrangian formalism. The peridynamic heat conduction parameters are related to those of the classical theory. An explicit time stepping scheme is adopted for numerical solution of various benchmark problems with known solutions. It paves the way for applying the peridynamic theory to other physical fields such as neutronic diffusion and electrical potential distribution
difference operator and a fractional variation of parameters formula, Communications in Applied Math...
International audienceThis article deals with the identification of a space and time dependent ...
We investigate the features arising from hydrodynamic effects in graphene and phosphorene devices wi...
In this study, Dual Horizon Peridynamics formulation is presented for thermal diffusion analysis. La...
Diffusion modeling is essential in understanding many physical phenomena such as heat transfer, mois...
Peridynamics is a well-established nonlocal method for modeling the deformation of solid bodies. The...
The peridynamic theory provides the capability for improved modeling of progressive failure in mater...
Modeling heat flow in bodies with discontinuities, such as cracks, or with inclusions that have dif...
A model order reduction methodology for reducing the order of the peridynamic transient heat model i...
This study presents peridynamic field equations for mechanical deformation, thermal diffusion, moist...
Peridynamics is an emerging nonlocal continuum theory which allows governing field equations to be a...
The problemof a fluid flow coupled with heat transfer isencountered in many engineeringapplications....
This study concerns the derivation of the coupled peridynamic (PD) thermomechanics equations based o...
We provide an overview on the problem of modeling heat transport at nanoscale and in far-from-equili...
Phonon heat conduction over length scales comparable to their mean free paths is a topic of consider...
difference operator and a fractional variation of parameters formula, Communications in Applied Math...
International audienceThis article deals with the identification of a space and time dependent ...
We investigate the features arising from hydrodynamic effects in graphene and phosphorene devices wi...
In this study, Dual Horizon Peridynamics formulation is presented for thermal diffusion analysis. La...
Diffusion modeling is essential in understanding many physical phenomena such as heat transfer, mois...
Peridynamics is a well-established nonlocal method for modeling the deformation of solid bodies. The...
The peridynamic theory provides the capability for improved modeling of progressive failure in mater...
Modeling heat flow in bodies with discontinuities, such as cracks, or with inclusions that have dif...
A model order reduction methodology for reducing the order of the peridynamic transient heat model i...
This study presents peridynamic field equations for mechanical deformation, thermal diffusion, moist...
Peridynamics is an emerging nonlocal continuum theory which allows governing field equations to be a...
The problemof a fluid flow coupled with heat transfer isencountered in many engineeringapplications....
This study concerns the derivation of the coupled peridynamic (PD) thermomechanics equations based o...
We provide an overview on the problem of modeling heat transport at nanoscale and in far-from-equili...
Phonon heat conduction over length scales comparable to their mean free paths is a topic of consider...
difference operator and a fractional variation of parameters formula, Communications in Applied Math...
International audienceThis article deals with the identification of a space and time dependent ...
We investigate the features arising from hydrodynamic effects in graphene and phosphorene devices wi...
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