Hydrodynamic alignment with pressure II. Multispecies

Abstract: We study the long-time hydrodynamic behavior of systems of multi-species which arise from agent-based description of alignment dynamics. The interaction between species is governed by an array of symmetric communication kernels. We prove that the crowd of different species flock towards the mean velocity if (i) cross-interactions form a heavy-tailed connected array of kernels, while (ii) self-interactions are governed by kernels with singular heads. The main new aspect here, is that flocking behavior holds without closure assumption on the specific form of pressure tensors. Specifically, we prove the long-time flocking behavior for connected arrays of multi-species, with self-interactions governed by entropic pressure laws [E. Tadmor, Swarming: hydrodynamic alignment with pressure, ArXiv 2208.11786, (2022)] and driven by fractional $p$-alignment. In particular, it follows that such multi-species hydrodynamics approaches a mono-kinetic description. This generalizes the mono-kinetic, "pressure-less" study in [S. He and E. Tadmor, A game of alignment: collective behavior of multi-species, AIHP (c) Non Linear Anal. 38(4) (2021) 1031-1053.]