Archive for Rational Mechanics and Analysis

, Volume 148, Issue 2, pp 107–143 | Cite as

Heteroclinic Networks in Coupled Cell Systems

  • Peter Ashwin
  • Michael Field


. We give an intrinsic definition of a heteroclinic network as a flow-invariant set that is indecomposable but not recurrent. Our definition covers many previously discussed examples of heteroclinic behavior. In addition, it provides a natural framework for discussing cycles between invariant sets more complicated than equilibria or limit cycles. We allow for cycles that connect chaotic sets (cycling chaos) or heteroclinic cycles (cycling cycles). Both phenomena can occur robustly in systems with symmetry.

We analyze the structure of a heteroclinic network as well as dynamics on and near the network. In particular, we introduce a notion of ‘depth’ for a heteroclinic network (simple cycles between equilibria have depth 1), characterize the connections and discuss issues of attraction, robustness and asymptotic behavior near a network.

We consider in detail a system of nine coupled cells where one can find a variety of complicated, yet robust, dynamics in simple polynomial vector fields that possess symmetries. For this model system, we find and prove the existence of depth‐2 networks involving connections between heteroclinic cycles and equilibria, and study bifurcations of such structures.


Unable to display preview. Download preview PDF.

Unable to display preview. Download preview PDF.

Copyright information

© Springer-Verlag Berlin Heidelberg 1999

Authors and Affiliations

  • Peter Ashwin
    • 1
  • Michael Field
    • 2
  1. 1.Department of Mathematics and Statistics, University of Surrey, Guildford GU2 5XH, UK, e‐mail: P.Ashwin@commat;
  2. 2.Department of Mathematics, University of Houston, Houston, Texas 77204‐3476, USA, e‐mail: mf@commat;uh.eduUS

Personalised recommendations