A singular perturbation analysis for the Brusselator
Abstract
In this work we study the Brusselator - a prototypical model for chemical oscillations - under the assumption that the bifurcation parameter is of order for positive . 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 , so that in polar coordinates , and by doing a further change of variable , we analyse the dynamics near the line at infinity, corresponding to the set . 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.
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}
}