Swarming Transition in Super-Diffusive Self-Propelled Particles

Overview

Journal Entropy (Basel)

Publisher MDPI

Date 2023 May 27

PMID 37238572

Authors

Morteza Nattagh Najafi

Rafe Md Abu Zayed

Seyed Amin Nabavizadeh

Affiliations

Soon will be listed here.

Abstract

A super-diffusive Vicsek model is introduced in this paper that incorporates Levy flights with exponent α. The inclusion of this feature leads to an increase in the fluctuations of the order parameter, ultimately resulting in the disorder phase becoming more dominant as α increases. The study finds that for α values close to two, the order-disorder transition is of the first order, while for small enough values of α, it shows degrees of similarities with the second-order phase transitions. The article formulates a mean field theory based on the growth of the swarmed clusters that accounts for the decrease in the transition point as α increases. The simulation results show that the order parameter exponent β, correlation length exponent ν, and susceptibility exponent γ remain constant when α is altered, satisfying a hyperscaling relation. The same happens for the mass fractal dimension, information dimension, and correlation dimension when α is far from two. The study reveals that the fractal dimension of the external perimeter of connected self-similar clusters conforms to the fractal dimension of Fortuin-Kasteleyn clusters of the two-dimensional Q=2 Potts (Ising) model. The critical exponents linked to the distribution function of global observables vary when α changes.

References

Rahimi-Majd M, Restrepo J, Najafi M . Stochastic and deterministic dynamics in networks with excitable nodes. Chaos. 2023; 33(2):023134. DOI: 10.1063/5.0103806. View

Chate H, Ginelli F, Gregoire G, Raynaud F . Collective motion of self-propelled particles interacting without cohesion. Phys Rev E Stat Nonlin Soft Matter Phys. 2008; 77(4 Pt 2):046113. DOI: 10.1103/PhysRevE.77.046113. View

Cavagna A, Cimarelli A, Giardina I, Parisi G, Santagati R, Stefanini F . Scale-free correlations in starling flocks. Proc Natl Acad Sci U S A. 2010; 107(26):11865-70. PMC: 2900681. DOI: 10.1073/pnas.1005766107. View

Toner , Tu . Long-Range Order in a Two-Dimensional Dynamical XY Model: How Birds Fly Together. Phys Rev Lett. 1995; 75(23):4326-4329. DOI: 10.1103/PhysRevLett.75.4326. View

Attanasi A, Cavagna A, Del Castello L, Giardina I, Melillo S, Parisi L . Finite-size scaling as a way to probe near-criticality in natural swarms. Phys Rev Lett. 2014; 113(23):238102. DOI: 10.1103/PhysRevLett.113.238102. View

Kearns D . A field guide to bacterial swarming motility. Nat Rev Microbiol. 2010; 8(9):634-44. PMC: 3135019. DOI: 10.1038/nrmicro2405. View

Baglietto G, Albano E, Candia J . Criticality and the onset of ordering in the standard Vicsek model. Interface Focus. 2013; 2(6):708-14. PMC: 3499120. DOI: 10.1098/rsfs.2012.0021. View

Gregoire G, Chate H . Onset of collective and cohesive motion. Phys Rev Lett. 2004; 92(2):025702. DOI: 10.1103/PhysRevLett.92.025702. View

Sampaio Filho C, Andrade J, Herrmann H, Moreira A . Elastic Backbone Defines a New Transition in the Percolation Model. Phys Rev Lett. 2018; 120(17):175701. DOI: 10.1103/PhysRevLett.120.175701. View

10.

Seisenberger G, Ried M, Endress T, Buning H, Hallek M, Brauchle C . Real-time single-molecule imaging of the infection pathway of an adeno-associated virus. Science. 2001; 294(5548):1929-32. DOI: 10.1126/science.1064103. View

11.

Allison C, Hughes C . Bacterial swarming: an example of prokaryotic differentiation and multicellular behaviour. Sci Prog. 1991; 75(298 Pt 3-4):403-22. View

12.

Caspi A, Granek R, Elbaum M . Diffusion and directed motion in cellular transport. Phys Rev E Stat Nonlin Soft Matter Phys. 2002; 66(1 Pt 1):011916. DOI: 10.1103/PhysRevE.66.011916. View

13.

Tolic-Norrelykke I, Munteanu E, Thon G, Oddershede L, Berg-Sorensen K . Anomalous diffusion in living yeast cells. Phys Rev Lett. 2004; 93(7):078102. DOI: 10.1103/PhysRevLett.93.078102. View

14.

Aldana M, Dossetti V, Huepe C, Kenkre V, Larralde H . Phase transitions in systems of self-propelled agents and related network models. Phys Rev Lett. 2007; 98(9):095702. DOI: 10.1103/PhysRevLett.98.095702. View

15.

Kyriakopoulos N, Chate H, Ginelli F . Clustering and anisotropic correlated percolation in polar flocks. Phys Rev E. 2019; 100(2-1):022606. DOI: 10.1103/PhysRevE.100.022606. View

16.

Buhl C, Sumpter D, Couzin I, Hale J, Despland E, Miller E . From disorder to order in marching locusts. Science. 2006; 312(5778):1402-6. DOI: 10.1126/science.1125142. View

17.

Shimoyama , Sugawara , Mizuguchi , Hayakawa , SANO . Collective motion in a system of motile elements. Phys Rev Lett. 1996; 76(20):3870-3873. DOI: 10.1103/PhysRevLett.76.3870. View

18.

Attanasi A, Cavagna A, Del Castello L, Giardina I, Grigera T, Jelic A . Information transfer and behavioural inertia in starling flocks. Nat Phys. 2014; 10(9):615-698. PMC: 4173114. DOI: 10.1038/nphys3035. View

19.

Copeland M, Weibel D . Bacterial Swarming: A Model System for Studying Dynamic Self-assembly. Soft Matter. 2013; 5(6):1174-1187. PMC: 3733279. DOI: 10.1039/B812146J. View

20.

Vicsek , Czirok , Cohen I , Shochet . Novel type of phase transition in a system of self-driven particles. Phys Rev Lett. 1995; 75(6):1226-1229. DOI: 10.1103/PhysRevLett.75.1226. View