We found a match
Your institution may have rights to this item. Sign in to continue.
- Title
Chaotic Behavior in Diffusively Coupled Systems.
- Authors
Nijholt, Eddie; Pereira, Tiago; Queiroz, Fernando C.; Turaev, Dmitry
- Abstract
We study emergent oscillatory behavior in networks of diffusively coupled nonlinear ordinary differential equations. Starting from a situation where each isolated node possesses a globally attracting equilibrium point, we give, for an arbitrary network configuration, general conditions for the existence of the diffusive coupling of a homogeneous strength which makes the network dynamics chaotic. The method is based on the theory of local bifurcations we develop for diffusively coupled networks. We, in particular, introduce the class of the so-called versatile network configurations and prove that the Taylor coefficients of the reduction to the center manifold for any versatile network can take any given value.
- Subjects
ORDINARY differential equations; NONLINEAR differential equations
- Publication
Communications in Mathematical Physics, 2023, Vol 401, Issue 3, p2715
- ISSN
0010-3616
- Publication type
Article
- DOI
10.1007/s00220-023-04699-5