Vanishing theorems for representation homology and the derived cotangent complex

Abstract

Let G be a reductive affine algebraic group defined over a field k of characteristic zero. In this paper, we study the cotangent complex of the derived G-representation scheme DRepG(X) of a pointed connected topological space X. We use an (algebraic version of) unstable Adams spectral sequence relating the cotangent homology of DRepG(X) to the representation homology HR*(X,G) := π* O[ DRepG(X)] to prove some vanishing theorems for groups and geometrically interesting spaces. Our examples include virtually free groups, Riemann surfaces, link complements in R3 and generalized lens spaces. In particular, for any f.g. virtually free group , we show that \, HRi( B, G) = 0 \, for all i > 0 . For a closed Riemann surface g of genus g 1 , we have \, HRi(g, G) = 0 \, for all i > G . The sharp vanishing bounds for g depend actually on the genus: we conjecture that if g = 1 , then \, HRi(g, G) = 0 \, for i > rank\,G , and if g 2 , then \, HRi(g, G) = 0 \, for i > \, Z(G) \,, where Z(G) is the center of G. We prove these bounds locally on the smooth locus of the representation scheme RepG[π1(g)]\, in the case of complex connected reductive groups. One important consequence of our results is the existence of a well-defined K-theoretic virtual fundamental class for DRepG(X) in the sense of Ciocan-Fontanine and Kapranov. We give a new `Tor formula' for this class in terms of functor homology.