Representation homology of simply connected spaces

Abstract

Let G be an affine algebraic group defined over field k of characteristic zero. We study the derived moduli space of G-local systems on a pointed connected CW complex X trivialized at the basepoint of X. This derived moduli space is represented by an affine DG scheme RLocG(X,*): we call the (co)homology of the structure sheaf of RLocG(X,*) the representation homology of X in G and denote it by HR*(X,G). The HR0(X,G) is isomorphic to the coordinate ring of the representation variety RepG[π1(X)] of the fundamental group of X in G -- a well-known algebro-geometric invariant of X with many applications in topology. The case when X is simply connected seems much less studied: in this case, the HR0(X,G) is trivial but the higher representation homology is still an interesting rational invariant of X depending on the algebraic group G. In this paper, we use rational homotopy theory to compute the HR*(X,G) for an arbitrary simply connected space X (of finite rational type) in terms of its Quillen and Sullivan algebraic models. When G is reductive, we also compute the G-invariant part of representation homology, HR*(X,G)G, and study the question when HR*(X,G)G is free of locally finite type as a graded commutative algebra. This question turns out to be closely related to the so-called Strong Macdonald Conjecture, a celebrated result in representation theory proposed (as a conjecture) by B. Feigin and P. Hanlon in the 1980s and proved by S. Fishel, I. Grojnowski and C. Teleman in 2008. Reformulating the Strong Macdonald Conjecture in topological terms, we give a simple characterization of spaces X for which HR*(X,G)G is a graded symmetric algebra for any complex reductive group G.