The topological chiral homology of the spherical category

Abstract

We consider the spherical DG category SphG attached to an affine algebraic group G. By definition, SphG := IndCoh(LSG(S2)) consists of ind-coherent sheaves of the stack of G-local systems on the 2-sphere S2. The 3-dimensional version of the pair of pants endows SphG with an E3-monoidal structure. More generally, for an algebraic stack Y (satisfying some mild conditions) and n ≥ -1, we can look at the En+1-monoidal DG category Sph(Y,n) := IndCoh0((YSn)Y), where IndCoh0 is the sheaf theory introduced in [AG2] and [centerH]. % The case of SphG is recovered by setting Y =BG and n=2. The cobordism hypothesis associates to Sph(Y,n) an (n+1)-dimensional TQFT, whose value of a manifold Md of dimension d ≤ n+1 (possibly with boundary) is given by the topological chiral homology ∫Md Sph(Y,n). % In this paper, we compute such homology (in virtually all cases): we have the Stokes style formula ∫Md Sph(Y,n) IndCoh0 ( (Y∂(Md × Dn+1-d))YM ) , where the formal completion is constructed using the obvious projection ∂(Md × Dn+1-d) Md. The most interesting instance of this formula is for SphG Sph(BG,2), the original spherical category, and X a Riemann surface. In this case, we obtain a monoidal equivalence ∫X SphG H(LSGBetti(X)), where LSGBetti(X) is the stack of G-local systems on the topological space underlying X and H is the sheaf theory introduced in [centerH].