无力互易的群聚体拓扑状态和连续体模型

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
P. Degond, A. Diez, Adam R. Walczak
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引用次数: 2

摘要

Swarmalator是一种既有自推进粒子又有振荡器的药剂系统。每个粒子都具有一个相位,该相位调节其与其他粒子的相互作用力。作为回报,相对位置调节相互作用粒子之间的相位同步。在目前的模型中,不存在力的互易性:当一个粒子吸引另一个粒子时,后者会排斥前者。这导致了一种追求行为。在本文中,我们导出了该群翼系统的流体动力学模型,并证明了它在两个空间维度上具有显式的双周期行波解。这些特殊的解决方案具有非平凡的拓扑结构,该拓扑结构通过沿任一维度的周期的相位矢量的索引来量化。通过研究模型的双曲性条件,研究了这些解的稳定性。给出了粒子模型和流体动力学模型的数值解。它们证实了小时间或大相位噪声的流体动力学模型与粒子模型的一致性,但也揭示了在小相位噪声的情况下出现的有趣模式。1 ar X iv:2 20 5。15 73 9v 1[m at hph]3 2年5月1日
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Topological states and continuum model for swarmalators without force reciprocity
Swarmalators are systems of agents which are both self-propelled particles and oscillators. Each particle is endowed with a phase which modulates its interaction force with the other particles. In return, relative positions modulate phase synchronization between interacting particles. In the present model, there is no force reciprocity: when a particle attracts another one, the latter repels the former. This results in a pursuit behavior. In this paper, we derive a hydrodynamic model of this swarmalator system and show that it has explicit doubly-periodic travelling-wave solutions in two space dimensions. These special solutions enjoy non-trivial topology quantified by the index of the phase vector along a period in either dimension. Stability of these solutions is studied by investigating the conditions for hyperbolicity of the model. Numerical solutions of both the particle and hydrodynamic models are shown. They confirm the consistency of the hydrodynamic model with the particle one for small times or large phase-noise but also reveal the emergence of intriguing patterns in the case of small phase-noise. 1 ar X iv :2 20 5. 15 73 9v 1 [ m at hph ] 3 1 M ay 2 02 2
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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