Topology change of levels sets in Morse theory

Abstract

Classical Morse theory proceeds by considering sublevel sets f-1(-∞, a] of a Morse function f: M R, where M is a smooth finite-dimensional manifold. In this paper, we study the topology of the level sets f-1(a) and give conditions under which the topology of f-1(a) changes when passing a critical value. We show that for a general class of functions, which includes all exhaustive Morse function, the topology of a regular level f-1(a) always changes when passing a single critical point, unless the index of the critical point is half the dimension of the manifold M. When f is a natural Hamiltonian on a cotangent bundle, we obtain more precise results in terms of the topology of the configuration space. (Counter-)examples and applications to celestial mechanics are also discussed.