A Unified Bond‐Based Peridynamic Model With Insights Into High‐Frequency Elastodynamic Problems in Geotechnical and Structural Engineering

IF 3.6 2区工程技术 Q2 ENGINEERING, GEOLOGICAL

International Journal for Numerical and Analytical Methods in Geomechanics Pub Date : 2025-09-09 DOI:10.1002/nag.70062

Luyu Wang, Zhen‐Yu Yin

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引用次数: 0

Abstract

The nonlocal effects in high‐frequency dynamic problems cannot be captured by classical continuum mechanics (CM), thereby introducing several compelling topics that warrant further exploration. Peridynamics (PD) offers a novel perspective for investigating these issues. This study proposes a unified bond‐based peridynamic (UBB‐PD) model, with an emphasis on high‐frequency dynamics that account for nonlocal properties. The UBB‐PD model incorporates a general criterion for constructing the micromodulus function. Then, the eigenfunction method is introduced to solve the UBB‐PD governing equations. The proposed model can naturally reduce into three different versions: CM, local PD model, and nonlocal PD model. The equivalence between PD and CM can be achieved by selecting an appropriate length‐scale parameter , with the wave frequency serving as a bridge connecting the two theories. Simulation results reveal that the local PD model perfectly reproduces the elastodynamic behavior found in CM across all frequencies. However, the nonlocal PD model inherently exhibits wave dispersion, arising from its nonlocal nature, which cannot be eliminated at high frequencies. PD stresses are affected by wave dispersion at high frequencies, with dissipative forces arising from inappropriate potentially inducing non‐conservation of mechanical energy. These results reveal findings not previously reported in relevant literature.

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一个统一的基于键的周动力模型，对岩土工程和结构工程中的高频弹性动力学问题有深刻的见解

经典连续介质力学（CM）无法捕捉高频动态问题中的非局部效应，因此引入了几个值得进一步探索的引人注目的主题。周围动力学（PD）为研究这些问题提供了一个新的视角。本研究提出了一个统一的基于键的周动力学（UBB - PD）模型，重点是考虑非局部性质的高频动力学。UBB - PD模型包含了构建微模函数的一般准则。然后，引入特征函数法求解UBB - PD控制方程。提出的模型可以自然地简化为三种不同的版本：CM、局部PD模型和非局部PD模型。PD和CM之间的等效可以通过选择合适的长度尺度参数来实现，波频率作为连接两种理论的桥梁。仿真结果表明，局部PD模型在所有频率上都能很好地再现CM中的弹性动力学行为。然而，非局域PD模型固有地表现出波色散，这是由其非局域性质引起的，在高频下无法消除。PD应力受高频波色散的影响，耗散力由不适当的可能诱导的机械能非守恒引起。这些结果揭示了先前相关文献未报道的发现。

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来源期刊

International Journal for Numerical and Analytical Methods in Geomechanics 工程技术-材料科学：综合

CiteScore

6.40

自引率

12.50%

发文量

160

审稿时长

9 months

期刊介绍： The journal welcomes manuscripts that substantially contribute to the understanding of the complex mechanical behaviour of geomaterials (soils, rocks, concrete, ice, snow, and powders), through innovative experimental techniques, and/or through the development of novel numerical or hybrid experimental/numerical modelling concepts in geomechanics. Topics of interest include instabilities and localization, interface and surface phenomena, fracture and failure, multi-physics and other time-dependent phenomena, micromechanics and multi-scale methods, and inverse analysis and stochastic methods. Papers related to energy and environmental issues are particularly welcome. The illustration of the proposed methods and techniques to engineering problems is encouraged. However, manuscripts dealing with applications of existing methods, or proposing incremental improvements to existing methods – in particular marginal extensions of existing analytical solutions or numerical methods – will not be considered for review.