English

A singular perturbation analysis for the Brusselator

Dynamical Systems 2023-12-19 v3

Abstract

In this work we study the Brusselator - a prototypical model for chemical oscillations - under the assumption that the bifurcation parameter is of order O(1/ϵ)O(1/\epsilon) for positive ϵ1\epsilon\ll 1. The dynamics of this mathematical model exhibits a time scale separation visible via fast and slow regimes along its unique attracting limit cycle. Noticeably this limit cycle accumulates at infinity as ϵ0\epsilon\rightarrow 0, so that in polar coordinates (θ,r)(\theta,r), and by doing a further change of variable rr1r\mapsto r^{-1}, we analyse the dynamics near the line at infinity, corresponding to the set {r=0}\{r=0\}. This object becomes a nonhyperbolic invariant manifold for which we use a desingularising rescaling, in order to study the closeby dynamics. Further use of geometric singular perturbation techniques allows us to give a decomposition of the Brusselator limit cycle in terms of four different fully quantified time scales.

Keywords

Cite

@article{arxiv.2311.00575,
  title  = {A singular perturbation analysis for the Brusselator},
  author = {Maximilian Engel and Guillermo Olicón-Méndez},
  journal= {arXiv preprint arXiv:2311.00575},
  year   = {2023}
}
R2 v1 2026-06-28T13:08:39.617Z