Bifurcations without parameters: some ODE and PDE examples
Abstract
Standard bifurcation theory is concerned with families of vector fields , , involving one or several constant real parameters . Viewed as a differential equation for the pair , we observe a foliation of the total phase space by constant . Frequently, the presence of a trivial stationary solution is also imposed: . Bifurcation without parameters, in contrast, discards the foliation by a constant parameter . Instead, we consider systems . Standard bifurcation theory then corresponds to the special case . To preserve only the trivial solution , instead, we only require for all . A rich dynamic phenomenology arises, when normal hyperbolicity of the trivial stationary manifold fails, due to zero or purely imaginary eigenvalues of the Jacobian . Specifically, we address the cases of failure of normal hyperbolicity due to a simple eigenvalue zero, a simple purely imaginary pair (Hopf bifurcation without parameters), a double eigenvalue zero (Takens-Bogdanov bifurcation without parameters), and due to a double eigenvalue zero with additional time reversal symmetries. The results are joint work with Andrei Afendikov, James C. Alexander, and Stefan Liebscher.
Keywords
Cite
@article{arxiv.math/0304453,
title = {Bifurcations without parameters: some ODE and PDE examples},
author = {Bernold Fiedler and Stefan Liebscher},
journal= {arXiv preprint arXiv:math/0304453},
year = {2007}
}