Litcius/Paper detail

The computational framework for continuum-kinematics-inspired peridynamics

Ali Javili, Soheil Firooz, Andrew McBride, Paul Steinmann

2020Computational Mechanics47 citationsDOIOpen Access PDF

Abstract

Abstract Peridynamics (PD) is a non-local continuum formulation. The original version of PD was restricted to bond-based interactions. Bond-based PD is geometrically exact and its kinematics are similar to classical continuum mechanics (CCM). However, it cannot capture the Poisson effect correctly. This shortcoming was addressed via state-based PD, but the kinematics are not accurately preserved. Continuum-kinematics-inspired peridynamics (CPD) provides a geometrically exact framework whose underlying kinematics coincide with that of CCM and captures the Poisson effect correctly. In CPD, one distinguishes between one-, two- and three-neighbour interactions. One-neighbour interactions are equivalent to the bond-based interactions of the original PD formalism. However, two- and three-neighbour interactions are fundamentally different from state-based interactions as the basic elements of continuum kinematics are preserved precisely. The objective of this contribution is to elaborate on computational aspects of CPD and present detailed derivations that are essential for its implementation. Key features of the resulting computational CPD are elucidated via a series of numerical examples. These include three-dimensional problems at large deformations. The proposed strategy is robust and the quadratic rate of convergence associated with the Newton–Raphson scheme is observed.

Topics & Concepts

PeridynamicsKinematicsFormalism (music)Classical mechanicsQuadratic equationComputational Science and EngineeringMathematicsPoisson distributionStatistical physicsComputer scienceContinuum mechanicsPhysicsApplied mathematicsGeometryArtVisual artsMusicalStatisticsNumerical methods in engineeringGeotechnical Engineering and Underground StructuresElectromagnetic Simulation and Numerical Methods