An extension of Lusternik-Schnirelmann category of closed 1-form to non compact manifolds
Abstract
Michael Farber introduced the Lusternik-Schnirelmann category cat(M,) for the pair of finite CW complex M and first-order cohomology . It is inspired by the Morse-Novikov theory, which is a closed 1-form version of the Morse theory. An important result of this theory is that if the number of zeros of a closed 1-form ω on a closed manifold is less than cat(M,[ω]), then any gradient flows of ω has at least one homoclinic cycle. This paper begins with an explanation of Lusternik-Schnirelmann theory of closed 1-form, and extends Farber's results to general non-compact manifolds. We will also explain that Farber's results hold equally well on non compact manifolds, and explain the new phenomena related gradient flows of ω that occurs on non compact manifolds.
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