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Eulerian dynamics with a commutator forcing III. Fractional diffusion of order $0<α<1$

arXiv:1706.08246 · doi:10.1016/j.physd.2017.09.003

Abstract

We continue our study of hydrodynamic models of self-organized evolution of agents with singular interaction kernel $ϕ(x) = |x|^{-(1+α)}$. Following our works \cite{ST2017a,ST2017b} which focused on the range $1\leq α<2$, and Do et. al. \cite{DKRT2017} which covered the range $0<α<1$, in this paper we revisit the latter case and give a short(-er) proof of global in time existence of smooth solutions, together with a full description of their long time dynamics. Specifically, we prove that starting from any initial condition in $(ρ_0,u_0) \in H^{2+α}\times H^3$, the solution approaches exponentially fast to a flocking state solution consisting of a wave $\barρ=ρ_\infty(x-t\bar{u}))$ traveling with a constant velocity determined by the conserved average velocity $\bar{u}$. The convergence is accompanied by exponential decay of all higher order derivatives of $u$.