A state-based peridynamic formulation for linear elastic shells is presented. The emphasis is on introducing, possibly for the first time, a general surface based peridynamic model to represent the deformation characteristics of structures that have one geometric dimension much smaller than the other two. A new notion of curved bonds is exploited to cater for force transfer between the peridynamic particles describing the shell. Starting with the three dimensional force and deformation states, appropriate surface based force, moment and several deformation states are arrived at. Upon application on the curved bonds, such states yield the necessary force and deformation vectors governing the motion of the shell. By incorporating a shear corr...
A state-based micropolar peridynamic theory for linear elastic solids is proposed. The main motivati...
This study presents the ordinary state-based peridynamic constitutive relations for plastic deformat...
Peridynamics is a continuum reformulation of the classical partial differential equations of motion....
A novel peridynamic model for predicting thermomechanical behaviour of three-dimensional shell struc...
A state-based peridynamic material model describes internal forces acting on a point in terms of the...
Abstract A generalization of the original peridynamic framework for solid mechan-ics is proposed. Th...
AbstractThis paper builds on the peridynamic state-based beam model to represent the bending of a Ki...
This study presents a novel ordinary state-based peridynamic model for geometrically nonlinear analy...
A generalization of the original peridynamic framework for solid mechanics is proposed. This general...
Peridynamics is a new modeling concept of non-local interactions for solid structures. The formulati...
In this paper a direct non-local peridynamics theory for thin plates is developed. Peridynamic point...
A state-based peridynamic material model describes internal forces acting on a point in terms of the...
Peridynamics (PD) is a non-local continuum theory that enables failure prediction. It enables both c...
AbstractThis paper develops a new peridynamic state based model to represent the bending of an Euler...
The nonlocal peridynamic theory has been proven extremely robust for predicting damage initiation an...
A state-based micropolar peridynamic theory for linear elastic solids is proposed. The main motivati...
This study presents the ordinary state-based peridynamic constitutive relations for plastic deformat...
Peridynamics is a continuum reformulation of the classical partial differential equations of motion....
A novel peridynamic model for predicting thermomechanical behaviour of three-dimensional shell struc...
A state-based peridynamic material model describes internal forces acting on a point in terms of the...
Abstract A generalization of the original peridynamic framework for solid mechan-ics is proposed. Th...
AbstractThis paper builds on the peridynamic state-based beam model to represent the bending of a Ki...
This study presents a novel ordinary state-based peridynamic model for geometrically nonlinear analy...
A generalization of the original peridynamic framework for solid mechanics is proposed. This general...
Peridynamics is a new modeling concept of non-local interactions for solid structures. The formulati...
In this paper a direct non-local peridynamics theory for thin plates is developed. Peridynamic point...
A state-based peridynamic material model describes internal forces acting on a point in terms of the...
Peridynamics (PD) is a non-local continuum theory that enables failure prediction. It enables both c...
AbstractThis paper develops a new peridynamic state based model to represent the bending of an Euler...
The nonlocal peridynamic theory has been proven extremely robust for predicting damage initiation an...
A state-based micropolar peridynamic theory for linear elastic solids is proposed. The main motivati...
This study presents the ordinary state-based peridynamic constitutive relations for plastic deformat...
Peridynamics is a continuum reformulation of the classical partial differential equations of motion....