C. Fressengeas, Tatiana Lebedkina, Mikhail Lebedkin
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引用次数: 0
Abstract
The paper is a tribute to Ladislas P. Kubin's long-standing work on the collective behavior of dislocations in jerky flow. In a first part, it reviews his contributions to the statistical, dynamical and multifractal analyses carried out on stress-time series recorded from both single crystals and polycrystalline samples of dilute alloys subjected to tensile tests at constant strain rate. Various spatio-temporal dynamical regimes were found as the applied strain rate was varied. Type C static bands were associated with quasi-random collective behavior, the hopping type B and propagating type A bands could be shown to correspond to chaotic and self-organized critical dynamics, respectively. The crossover between the A and B regimes was characterized by a large spread in the multifractal spectrum of stress drops, associated with heterogeneity of the dynamics. In a second part, the paper reviews the nonlocal models Ladislas inspired to interpret these results from numerical solutions of the boundary value problem, on the basis of dynamic strain aging, the incompatibility stresses associated with dislocations, their plastic relaxation and the spatial couplings they inherently involve. Eventual developments of this research, rooted in the same ideas, on the statistical and multifractal analyses of the accompanying acoustic emission are reviewed and discussed in terms of the synchronization of small-scale plastic events.
这篇论文是对拉迪斯拉斯-库宾(Ladislas P. Kubin)长期以来在锯齿流中位错集体行为方面所做工作的致敬。论文第一部分回顾了他在统计、动力学和多分形分析方面的贡献,这些分析是在恒定应变速率下对稀合金的单晶和多晶样品进行拉伸试验时记录的应力-时间序列。随着施加应变速率的变化,发现了各种时空动态机制。C 型静态带与准随机集体行为相关,B 型跳跃带和 A 型传播带分别对应于混沌和自组织临界动力学。A 和 B 两种状态之间的交叉特点是应力滴的多分形频谱分布较大,这与动力学的异质性有关。论文的第二部分回顾了拉迪斯拉斯启发的非局部模型,在动态应变老化、与位错相关的不相容应力、位错的塑性松弛及其固有的空间耦合的基础上,通过边界值问题的数值解来解释这些结果。本研究的最终发展也是基于同样的观点,即对伴随声发射的统计和多分形分析进行回顾,并从小规模塑性事件的同步性角度进行讨论。
期刊介绍:
Serving the multidisciplinary materials community, the journal aims to publish new research work that advances the understanding and prediction of material behaviour at scales from atomistic to macroscopic through modelling and simulation.
Subject coverage:
Modelling and/or simulation across materials science that emphasizes fundamental materials issues advancing the understanding and prediction of material behaviour. Interdisciplinary research that tackles challenging and complex materials problems where the governing phenomena may span different scales of materials behaviour, with an emphasis on the development of quantitative approaches to explain and predict experimental observations. Material processing that advances the fundamental materials science and engineering underpinning the connection between processing and properties. Covering all classes of materials, and mechanical, microstructural, electronic, chemical, biological, and optical properties.