Espaces de configuration g\'en\'eralis\'es. Espaces topologiques i-acycliques. Suites spectrales "basiques"

Abstract

The generalized (ordered) configuration spaces associated to a topological space X are the spaces ≤Xm:=\(x1,…,xm)∈ Xm\#\x1,…,xm\≤ \ and Xm:=≤Xm ≤-1. They are equipped with the action of the symmetric group Sm permuting coordinates. When X has no interior cohomology (i.e. is i-acyclic) we are able to compute explicitly the character formula of Sm acting on the cohomology of these spaces, and if X is furthermore a connected and oriented pseudomanifold of dimension ≥2 we generalize Church's representation stability theorem to the case of the families \≤ m-aXm\m and \-aXm\m. We show that, for fixed a,i∈ N, the families of representations \ Sm: H i(?m-aXm)\m are monotone and stationary for m≥4i+4a, if dX=2, and for m≥2i+4a, if dX≥3. The corresponding families of characters and Betti numbers are (hence) polynomial and the families of integers \ Bettii(?m-aXm / Sm)\m are constant within the same range of integers m. We further show that the family \ Bettii(mXm/ Sm)\m is constant for m≥ 2i, if dX=2, and for m≥ i, if dX≥3. In particular, complex algebraic varieties whether they are smooth on not verify these generalizations of Church's stability theorems.