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A new method based on Taylor expansion and nearest-node strategy to impose Dirichlet and Neumann boundary conditions in ordinary state-based Peridynamics

Francesco Scabbia, Mirco Zaccariotto, Ugo Galvanetto

2022Computational Mechanics28 citationsDOIOpen Access PDF

Abstract

Abstract Peridynamics is a non-local continuum theory which is able to model discontinuities in the displacement field, such as crack initiation and propagation in solid bodies. However, the non-local nature of the theory generates an undesired stiffness fluctuation near the boundary of the bodies, phenomenon known as “surface effect”. Moreover, a standard method to impose the boundary conditions in a non-local model is not currently available. We analyze the entity of the surface effect in ordinary state-based peridynamics by employing an innovative numerical algorithm to compute the peridynamic stress tensor. In order to mitigate the surface effect and impose Dirichlet and Neumann boundary conditions in a peridynamic way, we introduce a layer of fictitious nodes around the body, the displacements of which are determined by multiple Taylor series expansions based on the nearest-node strategy. Several numerical examples are presented to demonstrate the effectiveness and accuracy of the proposed method.

Topics & Concepts

PeridynamicsNeumann boundary conditionClassification of discontinuitiesDisplacement fieldBoundary (topology)Boundary value problemMathematical analysisDirichlet boundary conditionTaylor seriesMathematicsDiscretizationClassical mechanicsFinite element methodPhysicsContinuum mechanicsThermodynamicsNumerical methods in engineeringElectromagnetic Simulation and Numerical MethodsAdvanced Numerical Methods in Computational Mathematics