A stable splitting of factorisation homology of generalised surfaces

Abstract

For a manifold W and an Ed-algebra A, the factorisation homology ∫W A can be seen as a generalisation of the classical configuration space of labelled particles in W. It carries an action by the diffeomorphism group Diff∂(W), and for the generalised surfaces Wg,1:=(\#g Sn× Sn) D2n, we have stabilisation maps among the quotients ∫Wg,1 A\,/\!/\,Diff∂(Wg,1) which increase the genus g. In the case where a highly-connected tangential structure θ is taken into account, we describe its stable homology in terms of the iterated bar construction B2nA and a tangential Thom spectrum MTθ. We also consider the question of homological stability.

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