Local well-posedness of the topological Euler alignment models of collective behavior

Abstract

In this paper we address the problem of well-posedness of multi-dimensional topological Euler-alignment models introduced in ST-topo. The main result demonstrates local existence and uniqueness of classical solutions in class (,u) ∈ Hm+α × Hm+1 on the periodic domain Tn, where 0<α<2 is the order of singularity of the topological communication kernel φ(x,y), and m = m(n,α) is large. Our approach is based on new sharp coercivity estimates for the topological alignment operator \[ Lφ f(x) = ∫Tn φ(x,y) (f(y) - f(x) ) dy, \] which render proper a priori estimates and help stabilize viscous approximation of the system. In dimension 1, this result, in conjunction with the technique developed in ST-topo gives global well-posendess in the natural space of data mentioned above.