Lusternik-Schnirelmann Theory for a Morse Decomposition

Abstract

Let φt be a continuous flow on a metric space X and I be an isolated invariant set with an index pair (N,L) and a Morse decomposition \Mi\ni=1. For every category on N/L, we prove that (N/L)≤ ([L])+Σi=1n (Mi). As a result if φt|I is gradient-like and X is semi-locally contractible, then φt has at least H(h(I))-1 rest points in I where h(I) is the Conley index of I and H is the Homotopy Lusternik-Schnirelmann category.

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