How birds fly together: Long-range order in a two-dimensional dynamical XY model

John Toner(IBM T. J. Watson Research Center; Univ. of Oregon); Yuhai Tu (IBM T. J. Watson Research Center)

arxiv: adap-org/9506001 · v1 · pith:5DX6EGYMnew · submitted 1995-06-08 · adap-org · cond-mat· nlin.AO· nlin.PS· patt-sol

How birds fly together: Long-range order in a two-dimensional dynamical XY model

Yuhai Tu (IBM T. J. Watson Research Center) , John Toner(IBM T. J. Watson Research Center , Univ. of Oregon) This is my paper

classification adap-org cond-matnlin.AOnlin.PSpatt-sol

keywords modelbirdsdynamicalequilibriumlargeablebecomesbiological

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We propose a non-equilibrium continuum dynamical model for the collective motion of large groups of biological organisms (e.g., flocks of birds, slime molds, etc.) Our model becomes highly non-trivial, and different from the equilibrium model, for $d<d_c=4$; nonetheless, we are able to determine its scaling exponents {\it exactly} in $d=2$, and show that, unlike equilibrium systems, our model exhibits a broken continuous symmetry even in $d=2$. Our model describes a large universality class of microscopic rules, including those recently simulated by Viscek et. al.

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All-order RG analysis of Toner-Tu flocks in 2D isotropic diffusion yields a line of fixed points and marginal vertex instability at Δ/κ = 2π separating Gaussian and symmetry-protected interacting gapless phases with o...