Exit path categories induced by group actions
Abstract
We prove a structural result concerning the exit path category associated to a manifold M equipped with a smooth action of a finite group G. Specifically, the functor : Exit(M) → Exit(M/G) is a right fibration and Enter(M/G) is classified by a natural functor Enter(M/G) → OG, where OG is the orbit category of G. The main technical result manipulates exit paths to immediately exiting paths, enabling lifts of homotopies in M/G to homotopies in M.
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