Reconstruction of Manifolds from Their Morse Functions
Abstract
This paper describes how to recover the topology of a closed manifold M from a good Morse function f on M. The essential method was suggested by Cohen, Jones and Segal. They constructed a topological category Cf and claimed that the classifying space BCf is homeomorphic to M. We prove it from a different viewpoint with them using a cell decomposition of M associated to f. The cell complex Mf equipped with the decomposition induces a topological category C(Mf) whose classifying space BC(Mf) is homeomorphic to M. We show that C(Mf) is isomorphic to Cf as a topological category.
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