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JOURNALS // Zhurnal Srednevolzhskogo Matematicheskogo Obshchestva // Archive

Zhurnal SVMO, 2023 Volume 25, Number 4, Pages 342–360 (Mi svmo872)

This article is cited in 1 paper

Mathematical modeling and computer science

Investigation of different influence functions in peridynamics

Yu. N. Deryuginab, M. V. Vetchinnikova, D. A. Shishkanovab

a Federal State Unitary Enterprise "Russian Federal Nuclear Center — All-Russian Research Institute of Experimental Physics", Sarov, Nizhny Novgorod region
b Ogarev Mordovia State University, Saransk

Abstract: Peridynamics is a non–local numerical method for solving fracture problems based on integral equations. It is assumed that particles in a continuum are endowed with volume and interact with each other at a finite distance, as in molecular dynamics. The influence function in peridynamic models is used to limit the force acting on a particle and to adjust the bond strength depending on the distance between the particles. It satisfies certain continuity conditions and describes the behavior of non-local interaction. The article investigates various types of influence function in peridynamic models on the example of three-dimensional problems of elasticity and fracture. In the course of the work done, the bond-based and state-based fracture models used in the Sandia Laboratory are described, 6 types of influence functions for the bond-based model and 2 types of functions for the state-based model are presented, and the corresponding formulas for calculating the stiffness of the bond are obtained. For testing, we used the problem of propagation of a spherically symmetric elastic wave, which has an analytical solution, and a qualitative problem of destruction of a brittle disk under the action of a spherical impactor. Graphs of radial displacement are given, raster images of simulation results are shown.

Keywords: peridynamics, molecular dynamics, influence function, bond stiffness function, nonlocal interactions, interaction horizon, bond

UDC: 519.64:539.3

MSC: 74B05, 74R10

DOI: 10.15507/2079-6900.25.202304.342-360



© Steklov Math. Inst. of RAS, 2024