English

Well-posedness of aggregation-diffusion systems with irregular kernels

Analysis of PDEs 2025-10-14 v2

Abstract

We consider aggregation-diffusion equations with merely bounded nonlocal interaction potential KK. We are interested in establishing their well-posedness theory when the nonlocal interaction potential KK is neither differentiable nor positive (semi-)definite, thus preventing application of classical arguments. We prove the existence of weak solutions in two cases: if the mass of the initial data is sufficiently small, or if the interaction potential is symmetric and of bounded variation without any smallness assumption. The latter allows one to exploit the dissipation of the free energy in an optimal way, which is an entirely new approach. Remarkably, in both cases, under the additional condition that KK\nabla K\ast K is in L2L^2, we can prove that the solution is smooth and unique. When KK is a characteristic function of a ball, we construct the classical unique solution. Under additional structural conditions we extend these results to the nn-species system.

Keywords

Cite

@article{arxiv.2406.09227,
  title  = {Well-posedness of aggregation-diffusion systems with irregular kernels},
  author = {José A. Carrillo and Yurij Salmaniw and Jakub Skrzeczkowski},
  journal= {arXiv preprint arXiv:2406.09227},
  year   = {2025}
}
R2 v1 2026-06-28T17:04:44.178Z