Equilibration of aggregation-diffusion equations with weak interaction forces
Analysis of PDEs
2021-08-23 v2
Abstract
This paper studies the large time behavior of aggregation-diffusion equations. For one spatial dimension with certain assumptions on the interaction potential, the diffusion index , and the initial data, we prove the convergence to the unique steady state as time goes to infinity (equilibration), with an explicit algebraic rate. The proof is based on a uniform-in-time bound on the first moment of the density distribution, combined with an energy dissipation rate estimate. This is the first result on the equilibration of aggregation-diffusion equations for a general class of weakly confining potentials : those satisfying .
Cite
@article{arxiv.2003.04230,
title = {Equilibration of aggregation-diffusion equations with weak interaction forces},
author = {Ruiwen Shu},
journal= {arXiv preprint arXiv:2003.04230},
year = {2021}
}