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Graphon Limits of Graph Reaction--Diffusion Equations

Dynamical Systems 2026-04-24 v1 Probability

Abstract

A graph reaction--diffusion (RD) equation is a system of differential equations that is defined on the nodes of a graph. Consider a sequence of growing graphs that converges in cut norm to a limiting graphon. We show that the solutions of the sequence of graph RD equations converge in LpL^p norm, for p[1,]p \in [1,\infty], to the solution of a limiting nonlocal RD equation, which we call a graphon RD equation. Furthermore, we show a large numbers result for a stochastic particle process that consists of a random walk and a birth-death process on graphs. For a sequence of graphs that converge in cut norm to a limiting graphon, the sequence of stochastic processes converges in probability to the solution of the graphon RD equation.

Keywords

Cite

@article{arxiv.2604.20984,
  title  = {Graphon Limits of Graph Reaction--Diffusion Equations},
  author = {Edith J. Zhang and James Scott and Qiang Du},
  journal= {arXiv preprint arXiv:2604.20984},
  year   = {2026}
}
R2 v1 2026-07-01T12:31:14.917Z