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Main Authors: Liu, Chenguang, Sun, Jie, Tian, Hao, Don, WaiSun, Ju, Lili
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2401.04966
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author Liu, Chenguang
Sun, Jie
Tian, Hao
Don, WaiSun
Ju, Lili
author_facet Liu, Chenguang
Sun, Jie
Tian, Hao
Don, WaiSun
Ju, Lili
contents A high-order multi-time-step (MTS) scheme for the bond-based peridynamic (PD) model, an extension of classical continuous mechanics widely used for analyzing discontinuous problems like cracks, is proposed. The MTS scheme discretizes the spatial domain with a meshfree method and advances in time with a high-order Runge-Kutta method. To effectively handle discontinuities (cracks) that appear in a local subdomain in the solution, the scheme employs the Taylor expansion and Lagrange interpolation polynomials with a finer time step size, that is, coarse and fine time step sizes for smooth and discontinuous subdomains, respectively, to achieve accurate and efficient simulations. By eliminating unnecessary fine-scale resolution imposed on the entire domain, the MTS scheme outperforms the standard PD scheme by significantly reducing computational costs, particularly for problems with discontinuous solutions, as demonstrated by comprehensive theoretical analysis and numerical experiments.
format Preprint
id arxiv_https___arxiv_org_abs_2401_04966
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A high-order multi-time-step scheme for bond-based peridynamics
Liu, Chenguang
Sun, Jie
Tian, Hao
Don, WaiSun
Ju, Lili
Numerical Analysis
Analysis of PDEs
A high-order multi-time-step (MTS) scheme for the bond-based peridynamic (PD) model, an extension of classical continuous mechanics widely used for analyzing discontinuous problems like cracks, is proposed. The MTS scheme discretizes the spatial domain with a meshfree method and advances in time with a high-order Runge-Kutta method. To effectively handle discontinuities (cracks) that appear in a local subdomain in the solution, the scheme employs the Taylor expansion and Lagrange interpolation polynomials with a finer time step size, that is, coarse and fine time step sizes for smooth and discontinuous subdomains, respectively, to achieve accurate and efficient simulations. By eliminating unnecessary fine-scale resolution imposed on the entire domain, the MTS scheme outperforms the standard PD scheme by significantly reducing computational costs, particularly for problems with discontinuous solutions, as demonstrated by comprehensive theoretical analysis and numerical experiments.
title A high-order multi-time-step scheme for bond-based peridynamics
topic Numerical Analysis
Analysis of PDEs
url https://arxiv.org/abs/2401.04966