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An Invariant Set Bifurcation Theory for Nonautonomous Nonlinear Evolution Equations

In this paper we establish an invariant set bifurcation theory for the nonautonomous dynamical system $(\va_\lam,\0)_{X,\cH}$ generated by the evolution equation \be\label{e0}u_t+Au=\lam u+p(t,u),\hs p\in \cH=\cH[f(\.,u)]\ee on a Hilbert space $X$, where $A$ is a sectorial operator, $\lam$ is the bifurcation parameter, $f(\.,u):\R\ra X$ is translation compact, $f(t,0)\equiv0$ and $\cH[f]$ is the hull of $f(\.,u)$. Denote by $\va_\lam:=\va_\lam(t,p)u$ the cocycle semiflow generated by the equation. Under some other assumptions on $f$, we show that as the parameter $\lam$ crosses an eigenvalue $\lam_0\in\R$ of $A$, the system bifurcates from $0$ to a nonautonomous invariant set $B_\lam(\.)$ on one-sided neighborhood of $\lam_0$. Moreover, $$\lim_{\lam\ra\lam_0}H_{X^\a}\(B_\lam(p),0\)=0,\hs p\in P,$$ where $H_{X^\a}(\.,\.)$ denotes the Hausdorff semidistance in $X^\a$ (here $X^α$ ($\a\geq0$) defined below is the fractional power spaces associated with $A$). Our result is based on the pullback attractor bifurcation on the local central invariant manifolds $\cM^\lam_{loc}(\.)$.