English

Bifurcations without parameters: some ODE and PDE examples

Dynamical Systems 2007-05-23 v1

Abstract

Standard bifurcation theory is concerned with families of vector fields dx/dt=f(x,λ)dx/dt = f(x,\lambda), xRnx \in \R^n, involving one or several constant real parameters λ\lambda. Viewed as a differential equation for the pair (x,λ)(x,\lambda), we observe a foliation of the total phase space by constant λ\lambda. Frequently, the presence of a trivial stationary solution x=0x=0 is also imposed: 0=f(0,λ)0 = f(0,\lambda). Bifurcation without parameters, in contrast, discards the foliation by a constant parameter λ\lambda. Instead, we consider systems dx/dt=f(x,y),dy/dt=g(x,y)dx/dt = f(x,y), dy/dt = g(x,y). Standard bifurcation theory then corresponds to the special case y=λ,g=0y=\lambda, g=0. To preserve only the trivial solution x=0x=0, instead, we only require 0=f(0,y)=g(0,y)0 = f(0,y) = g(0,y) for all yy. A rich dynamic phenomenology arises, when normal hyperbolicity of the trivial stationary manifold x=0x=0 fails, due to zero or purely imaginary eigenvalues of the Jacobian fx(0,y)f_x(0,y). 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}
}