The configuration functor of a punctured space

Abstract

Let U be a space whose one point compactification U* is a CW-complex for which the added point * is the only 0-cell. We observe that the configuration space Confn(U) of n numbered distinct points in U has no closed support homology in degree <n and prove that Borel-Moore homology group Hcln(Confn(U)) depends only on the fundamental group π1(U*,*). We describe this homology group in terms of a presentation of π1(U*,*). A case of interest is when U is a connected closed oriented surface of positive genus minus a finite nonempty set. Then the mapping class group Mod(U) of U acts on both π1(U*,*) and Hk(Confn(U)) Hcl 2n-k(Confn(U)) and we prove that its action on the latter is through its action on the nilpotent quotient π1(U*,*)/ π1(U*,*)(k+1). Furthermore, we give an example of a mapping class of a once punctured closed surface U which acts trivially on Hn(Confn(U)), but not on the nilpotent quotient π1(U*,*)/ π1(U*,*)(n+1). The former generalizes a theorem of Bianchi-Miller-Wilson and the latter disproves a conjecture of theirs.