Event description
We study equilibration rates for nonlocal Fokker-Planck equations arising in swarm manufacturing. The PDEs of interest possess a time-dependent nonlocal diffusion coefficient and a nonlocal drift, modeling the interaction of a large system of agents. The emerging steady profile is characterized by a uniform spreading over a portion of the domain. The result follows by combining entropy methods for quantifying the decay of the solution towards its quasi-stationary distribution with the properties of the quasi-stationary profile.