Litcius/Paper detail

A space-time discretization of a nonlinear peridynamic model on a 2D lamina

L. Lopez, Sabrina Francesca Pellegrino

2022CINECA IRIS Institutional Research Information System (University of Bari Aldo Moro)34 citationsDOIOpen Access PDF

Abstract

Peridynamics is a nonlocal theory for dynamic fracture analysis consisting in a second order in time partial integro-differential equation. In this paper, we consider a nonlinear model of peridynamics in a two-dimensional spatial domain. We implement a spectral method for the space discretization based on the Fourier expansion of the solution while we consider the Newmark-β method for the time marching. This computational approach takes advantages from the convolutional form of the peridynamic operator and from the use of the discrete Fourier transform. We show a convergence result for the fully discrete approximation and study the stability of the method applied to the linear peridynamic model. Finally, we perform several numerical tests and comparisons to validate our results and provide simulations implementing a volume penalization technique to avoid the limitation of periodic boundary conditions due to the spectral approach.

Topics & Concepts

PeridynamicsDiscretizationMathematicsNonlinear systemMathematical analysisApplied mathematicsClassical mechanicsPhysicsContinuum mechanicsQuantum mechanicsNumerical methods in engineeringElectromagnetic Simulation and Numerical MethodsAdvanced Numerical Methods in Computational Mathematics