Morse-Novikov homology and β-critical points

Abstract

Given a manifold M, some closed β∈1(M) and a map f∈ C∞(M), a β-critical point is some x∈ M such that dβ fx=0 for the Lichnerowicz derivative dβ. In this paper, we will give a lower bound for the number of β-critical points of index i of a β-Morse function f in terms of the Morse-Novikov homology, and we generalize this result to generating functions (quadratic at infinity). We also give an application to the detection of essential Liouville chords of a set length. These are a type of chords that appear in locally conformally symplectic geometry as even-dimensional analogues to Reeb chords.