Periodicity in the homology of moduli spaces of disconnected submanifolds
Abstract
We show that the moduli space of n suitably embedded copies of a closed smooth manifold P inside a closed smooth manifold M satisfies cohomological periodicity over F when n grows, with an explicit linear bound on the period and the periodicity range. This generalizes a known result about configuration spaces. We also show integral stability of the cohomology when M is open, reproving a result of Palmer and improving the slope when inverting 2. The main input in the proof is Goodwillie and Klein's multiple disjunction lemma for embedding spaces. As a corollary we get stability and periodicity results for some classes of symmetric diffeomorphism groups of manifolds.
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