The full text of this article is unavailable through your IP address: 3.135.214.226
Contents Online
Dynamics of Partial Differential Equations
Volume 18 (2021)
Number 2
A remark on attractor bifurcation
Pages: 157 – 172
DOI: https://dx.doi.org/10.4310/DPDE.2021.v18.n2.a4
Authors
Abstract
In this paper we present some local dynamic bifurcation results in terms of invariant sets of nonlinear evolution equations. We show that if the trivial solution is an isolated invariant set of the system at the critical value $\lambda = \lambda_0$, then either there exists a one-sided neighborhood $I^{-}$ of $\lambda_0$ such that for each $\lambda \in I^{-}$, the system bifurcates from the trivial solution to an isolated nonempty compact invariant set $K_\lambda$ with $0 \notin K_\lambda$, or there is a one-sided neighborhood $I^{+}$ of $\lambda_0$ such that the system undergoes an attractor bifurcation for $\lambda \in I^{+}$ from $(0, \lambda_0)$. Then we give a modified version of the attractor bifurcation theorem. Finally, we consider the classical Swift–Hohenberg equation and illustrate how to apply our results to a concrete evolution equation.
Keywords
invariant-set bifurcation, attractor bifurcation, nonlinear evolution equation
2010 Mathematics Subject Classification
35B32, 37B30, 37G35
Received 30 September 2020
Published 10 May 2021