Twisted cohomology of configuration spaces and spaces of maximal tori via point-counting

Abstract

We consider two families of algebraic varieties Yn indexed by natural numbers n: the configuration space of unordered n-tuples of distinct points on C, and the space of unordered n-tuples of linearly independent lines in Cn. Let Wn be any sequence of virtual Sn-representations given by a character polynomial, we compute Hi(Yn; Wn) for all i and all n in terms of double generating functions. One consequence of the computation is a new recurrence phenomenon: the stable twisted Betti numbers n∞ Hi(Yn; Wn) are linearly recurrent in i. Our method is to compute twisted point-counts on the Fq-points of certain algebraic varieties, and then pass through the Grothendieck-Lefschetz fixed point formula to prove results in topology. We also generalize a result of Church-Ellenberg-Farb about the configuration spaces of the affine line to those of a general smooth variety.