English

Linking and the Morse complex

Geometric Topology 2014-09-10 v1 Differential Geometry

Abstract

For a Morse function f on a compact oriented manifold M, we show that f has more critical points than the number required by the Morse inequalities if and only if there exists a certain class of link in M whose components have nontrivial linking number, such that the minimal value of f on one of the components is larger than its maximal value on the other. Indeed we characterize the precise number of critical points of f in terms of the Betti numbers of M and the behavior of f with respect to links. This can be viewed as a refinement, in the case of compact manifolds, of the Rabinowitz Saddle Point Theorem. Our approach, inspired in part by techniques of chain-level symplectic Floer theory, involves associating to collections of chains in M algebraic operations on the Morse complex of f, which yields relationships between the linking numbers of homologically trivial (pseudo)cycles in M and an algebraic linking pairing on the Morse complex.

Keywords

Cite

@article{arxiv.1207.0889,
  title  = {Linking and the Morse complex},
  author = {Michael Usher},
  journal= {arXiv preprint arXiv:1207.0889},
  year   = {2014}
}

Comments

46 pages; some of the length is due to the inclusion of details of somewhat-standard arguments in the hopes of making the paper more broadly accessible. Preliminary version, comments very welcome

R2 v1 2026-06-21T21:30:12.713Z