Vortex Arrays and Mesoscale Turbulence of Self-Propelled Particles

Großmann, Robert; Romanczuk, Pawel; Bär, Markus; Schimansky‐Geier, Lutz

doi:10.1103/physrevlett.113.258104

Cited by 106 publications

(152 citation statements)

References 43 publications

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“…Truncating the series of angular Fourier coefficients of particles distribution is vastly used in active matter to obtain the continuum equations [34,[59][60][61]. This method has a reasonable accuracy in determining the phase boundaries.…”

Section: Introductionmentioning

confidence: 99%

Gaussian theory for spatially distributed self-propelled particles

2016

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Obtaining a reduced description with particle and momentum flux densities outgoing from the microscopic equations of motion of the particles requires approximations. The usual method, we refer to as truncation method, is to zero Fourier modes of the orientation distribution starting from a given number. Here we propose another method to derive continuum equations for interacting selfpropelled particles. The derivation is based on a Gaussian approximation (GA) of the distribution of the direction of particles. First, by means of simulation of the microscopic model we justify that the distribution of individual directions fits well to a wrapped Gaussian distribution. Second, we numerically integrate the continuum equations derived in the GA in order to compare with results of simulations. We obtain that the global polarization in the GA exhibits a hysteresis in dependence on the noise intensity. It shows qualitatively the same behavior as we find in particles simulations. Moreover, both global polarizations agree perfectly for low noise intensities. The spatio-temporal structures of the GA are also in agreement with simulations. We conclude that the GA shows qualitative agreement for a wide range of noise intensities. In particular, for low noise intensities the agreement with simulations is better as other approximations, making the GA to an acceptable candidates of describing spatially distributed self-propelled particles.

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Section: Introductionmentioning

confidence: 99%

Gaussian theory for spatially distributed self-propelled particles

2016

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“…It is tempting to describe such a system through a local mean-field approach [77,78,79,80]. Note that similar approaches have also been used for self-propelled particles with nematic interactions [81,82,78,83].…”

Section: Self-propelled Particles With Short-range Aligning Interactionsmentioning

confidence: 99%

“…In a similar way, Γ(r, t) denotes the average torque resulting from the average over the positions of the swimmers. Thanks to the linearity of the Stokes equation (80), the average velocity field u(r, t) is obtained by solving the average Stokes equation…”

Section: Statistical Description In the Local Mean-field Approximationmentioning

confidence: 99%

Theoretical approaches to the steady-state statistical physics of interacting dissipative units

Bertin¹

2017

J. Phys. A: Math. Theor.

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Abstract. The aim of this review is to provide a concise overview of some of the generic approaches that have been developed to deal with the statistical description of large systems of interacting dissipative 'units'. The latter notion includes, e.g., inelastic grains, active or self-propelled particles, bubbles in a foam, low-dimensional dynamical systems like driven oscillators, or even spatially extended modes like Fourier modes of the velocity field in a fluid for instance. We first review methods based on the statistical properties of a single unit, starting with elementary mean-field approximations, either static or dynamic, that describe a unit embedded in a 'selfconsistent' environment. We then discuss how this basic mean-field approach can be extended to account for spatial dependences, in the form of space-dependent mean-field Fokker-Planck equations for example. We also briefly review the use of kinetic theory in the framework of the Boltzmann equation, which is an appropriate description for dilute systems. We then turn to descriptions in terms of the full N -body distribution, starting from exact solutions of one-dimensional models, using a Matrix Product Ansatz method when correlations are present. Since exactly solvable models are scarce, we also present some approximation methods that can be used to determine the N -body distribution in a large system of dissipative units. These methods include the Edwards approach for dense granular matter and the approximate treatment of multiparticle Langevin equations with coloured noise, which models systems of self-propelled particles. Throughout this review, emphasis is put on methodological aspects of the statistical modeling and on formal similarities between different physical problems, rather than on the specific behaviour of a given system.

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“…This includes the individual dynamics of particles with complex shape [7][8][9], as well as cases of self-rotation [9][10][11][12][13][14][15]. Furthermore, the collective behavior of many such interacting particles has been explored [16][17][18][19][20][21][22][23][24][25][26][27][28][29][30][31][32][33][34][35]. Collections of self-propelled particles in liquid environment exhibit fascinating and complex nonequilibrium phenomena emerging from self-organization, where hydrodynamic interactions can play a significant role [11,[36][37][38][39][40][41][42][43][44][45][46][47][48][49][50][51][52].…”

Section: Introductionmentioning

confidence: 99%

Getting drowned in a swirl: Deformable bead-spring model microswimmers in external flow fields

2016

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Deformability is a central feature of many types of microswimmers, e.g. for artificially generated self-propelled droplets. Here, we analyze deformable bead-spring microswimmers in an externally imposed solvent flow field as simple theoretical model systems. We focus on their behavior in a circular swirl flow in two spatial dimensions. Linear (straight) two-bead swimmers are found to circle around the swirl with a slight drift to the outside with increasing activity. In contrast to that, we observe for triangular three-bead or square-like four-bead swimmers a tendency of being drawn into the swirl and finally getting drowned, although a radial inward component is absent in the flow field. During one cycle around the swirl, the self-propulsion direction of an active triangular or square-like swimmer remains almost constant, while their orbits become deformed exhibiting an "egg-like" shape. Over time, the swirl flow induces slight net rotations of these swimmer types, which leads to net rotations of the egg-shaped orbits. Interestingly, in certain cases, the orbital rotation changes sense when the swimmer approaches the flow singularity. Our predictions can be verified in real-space experiments on artificial microswimmers.

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Vortex Arrays and Mesoscale Turbulence of Self-Propelled Particles

Cited by 106 publications

References 43 publications

Gaussian theory for spatially distributed self-propelled particles

Gaussian theory for spatially distributed self-propelled particles

Theoretical approaches to the steady-state statistical physics of interacting dissipative units

Getting drowned in a swirl: Deformable bead-spring model microswimmers in external flow fields

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