English

A heterogeneous nonlocal advection--diffusion system

Analysis of PDEs 2026-03-19 v1

Abstract

We present a self-contained investigation on the local and global well-posedness for a system of nonlocal advection--diffusion equations for a heterogeneous population over Rd\mathbb{R}^d, dNd \in \mathbb{N}. Each convolution kernel KijK_{ij}, which describes the nonlocal advection of species ii according to the distribution of species jj, is assumed to have its own regularity KijLqij(Rd),1<qij<\nabla K_{ij} \in L^{q_{ij}}(\mathbb{R}^d),\, 1 < q_{ij} < \infty. Local well-posedness of the mild solution and its regularity is obtained using semigroup theory and contraction mapping arguments. For families of kernels classified as regular, a global bound is established using a Nash-type inequality. For suitable irregular families of kernels, global boundedness is instead obtained via a smallness condition on the initial data. A one-dimensional numerical example is provided to illustrate the influence of kernel regularity on the solutions.

Keywords

Cite

@article{arxiv.2603.17749,
  title  = {A heterogeneous nonlocal advection--diffusion system},
  author = {Joseph McCusker and John Christopher Meyer and Mabel Lizzy Rajendran},
  journal= {arXiv preprint arXiv:2603.17749},
  year   = {2026}
}
R2 v1 2026-07-01T11:26:13.378Z