Decoupling decorations on moduli spaces of manifolds

Abstract

We consider moduli spaces of d-dimensional manifolds with embedded particles and discs. In this moduli space, the location of the particles and discs is constrained by the d-dimensional manifold. We will compare this moduli space with the moduli space of d-dimensional manifolds in which the location of such decorations is no longer constrained, i.e. the decorations are decoupled. We generalise work by B\"odigheimer--Tillmann for oriented surfaces and obtain new results for surfaces with different tangential structures as well as to higher dimensional manifolds. We also provide a generalisation of this result to moduli spaces with more general submanifold decorations and specialise in the case of decorations being unparametrised unlinked circles.