On the Structure of Limiting Flocks in Hydrodynamic Euler Alignment Models

Abstract

The goal of this note is to study limiting behavior of a self-organized continuous flock evolving according to the 1D hydrodynamic Euler Alignment model. We provide a series of quantitative estimates that show how far the density of the limiting flock is from a uniform distribution. The key quantity that controls density distortion is the entropy H = ∫ \,dx, and the measure of deviation from uniformity is given by a well-known conserved quantity e = u' + L , where u is velocity and L is the communication operator with kernel . The cases of Lipschitz, singular geometric, and topological kernels are covered in the study.