Analytical model for the motion and interaction of two-dimensional active nematic defects

Cody D. Schimming, C. J. O. Reichhardt, C. Reichhardt
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Abstract

We develop an approximate, analytical model for the velocity of defects in active nematics by combining recent results for the velocity of topological defects in nematic liquid crystals with the flow field generated from individual defects in active nematics. Importantly, our model takes into account the long-range interactions between defects that result from the flows they produce as well as the orientational coupling between defects inherent in nematics. We show that the model can analytically predict bound states between two $+1/2$ winding number defects, effective attraction between two $-1/2$ defects, and the scaling of a critical unbinding length between $\pm 1/2$ defects with activity. The model also gives predictions for the trajectories of defects, such as the scattering of $+1/2$ defects by $-1/2$ defects at a critical impact parameter that depends on activity. In the presence of circular confinement, the model predicts a braiding motion for three $+1/2$ defects that was recently seen in experiments.
二维活性向列缺陷运动和相互作用的分析模型
我们通过将向列液晶中拓扑缺陷速度的最新研究成果与活性向列中单个缺陷产生的流场相结合,建立了非活性向列缺陷速度的近似分析模型。重要的是,我们的模型考虑到了缺陷产生的流动所导致的缺陷之间的长程相互作用以及固有向列缺陷之间的取向耦合。我们的研究表明,该模型可以分析预测两个绕组数为 $+1/2$ 的缺陷之间的结合态、两个绕组数为 $-1/2$ 的缺陷之间的有效吸引力,以及绕组数为 $pm 1/2$ 的缺陷之间的临界解结合长度随活性变化的比例。该模型还给出了缺陷轨迹的预测,如在取决于活性的临界冲击参数下,$+1/2$缺陷对$-1/2$缺陷的散射。在存在环形约束的情况下,该模型预测了三个 $+1/2$ 缺陷的编织运动,这也是最近在实验中看到的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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