Equilibrium Index of Invariant Sets and Global Static Bifurcation for Nonlinear Evolution Equations

Abstract

We introduce the notion of equilibrium index for statically isolated invariant sets of the system ut+A u=fλ(u) on Banach space X (where A is a sectorial operator with compact resolvent) and present a reduction theorem and an index formula for bifurcating invariant sets near equilibrium points. Then we prove a new global static bifurcation theorem where the crossing number m may be even. In particular, in case m=2, we show that the system undergoes either an attractor/repeller bifurcation, or a global static bifurcation. An illustrating example is also given by considering the bifurcations of the periodic boundary value problem of second-order differential equations.