2021
DOI: 10.48550/arxiv.2112.13415
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Self-propulsion with speed and orientation fluctuation: exact computation of moments and dynamical bistabilities in displacement

Amir Shee,
Debasish Chaudhuri

Abstract: We consider the influence of active speed fluctuations on the dynamics of a d-dimensional active Brownian particle performing a persistent stochastic motion. We use the Laplace transform of the Fokker-Planck equation to obtain exact expressions for time-dependent dynamical moments. Our results agree with direct numerical simulations and show several dynamical crossovers determined by the activity, persistence, and speed fluctuation. The persistence in the motion leads to anisotropy, with the parallel component… Show more

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Cited by 2 publications
(2 citation statements)
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“…In fact, our framework is quite generic and expected to be applicable to any Fokker-Planck or master equation involving a small perturbative parameter. For example it would be interesting to study the signatures of activity in other variants of active particle models [27,39,[47][48][49] It would be also interesting to ask similar questions for the generalized run-and-tumble process, where the large time scaling of the position fluctuations is anomalous [50]. Another future direction is to extend the framework to systematically study the subleading corrections to the long-time t −3/2 behavior of the first-passage time probability distributions of active motions.…”
Section: Discussionmentioning
confidence: 99%
“…In fact, our framework is quite generic and expected to be applicable to any Fokker-Planck or master equation involving a small perturbative parameter. For example it would be interesting to study the signatures of activity in other variants of active particle models [27,39,[47][48][49] It would be also interesting to ask similar questions for the generalized run-and-tumble process, where the large time scaling of the position fluctuations is anomalous [50]. Another future direction is to extend the framework to systematically study the subleading corrections to the long-time t −3/2 behavior of the first-passage time probability distributions of active motions.…”
Section: Discussionmentioning
confidence: 99%
“…Also macroscopic agents like locusts 81 , whirligig beetles 82 or zebrafish 14,83,84 exhibit natural speed fluctuations. To realistically describe these systems, a theoretical approach should incorporate both fluctuations of the modulus and the direction of the self-propulsion velocity [83][84][85][86][87] . For this purpose, our description within the PAM is particularly convenient, because it is based on a single stochastic process n of unit standard deviation (i.e., v 0 is treated as a velocity scale and does not fluctuate itself), such that all descendant models with an intermediate value of the parameter µ can be evaluated with the same numerical effort as ABPs and AOUPs.…”
Section: Parental Active Modelmentioning
confidence: 99%