Curvature dependent dynamics of a bacterium confined in a giant unilamellar vesicle

Olivia Vincent, Aparna Sreekumari, Manoj Gopalakrishnan, Vishwas V Vasisht, Bibhu Ranjan Sarangi
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Abstract

We investigate the positional behavior of a single bacterium confined within a vesicle by measuring the probability of locating the bacterium at a certain distance from the vesicle boundary. We observe that the distribution is bi-exponential in nature. Near the boundary, the distribution exhibits rapid exponential decay, transitioning to a slower exponential decay, and eventually becoming uniform further away from the boundary. The length scales associated with the decay are found to depend on the confinement radius. We interpret these observations using molecular simulations and analytical calculations based on the Fokker-Planck equation for an Active Brownian Particle model. Our findings reveal that the small length scale is strongly influenced by the translational diffusion coefficient, while the larger length scale is governed by rotational diffusivity and self-propulsion. These results are explained in terms of two dimensionless parameters that explicitly include the confinement radius. The scaling behavior predicted analytically for the observed length scales is confirmed through simulations.
封闭在巨型单拉美米尔囊泡中的细菌的曲率动力学
我们通过测量细菌在距离囊泡边界一定距离处的定位概率,研究了与囊泡密闭的单个细菌的定位行为。我们观察到,该分布具有双指数性质。在边界附近,该分布呈现快速指数衰减,然后过渡到较慢的指数衰减,最终在远离边界的地方趋于均匀。与衰减相关的长度尺度取决于约束半径。我们利用分子模拟和基于主动布朗粒子模型福克-普朗克方程的分析计算来解释这些观察结果。我们的研究结果表明,小长度尺度受翻译扩散系数的影响很大,而大长度尺度则受旋转扩散性和自推进力的影响。这些结果可以用明确包含约束半径的两个无量纲参数来解释。分析预测的观测长度尺度的缩放行为通过模拟得到了证实。
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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