GKM sheaves and nonorientable surface group representations

Abstract

Let T be a compact torus and X a nice compact T-space (say a manifold or variety). We introduce a functor assigning to X a "GKM-sheaf" FX over a "GKM-hypergraph" GX. Under the condition that X is equivariantly formal, the ring of global sections of FX are identified with the equivariant cohomology, HT*(X; C). We show that GKM-sheaves provide a general framework able to incorporate numerous constructions in the GKM-theory literature. In the second half of the paper we apply these ideas to study the equivariant topology of the representation variety RK := Hom(π1(S), K) under conjugation by K, where S is a nonorientable surface and K is a compact connected Lie group. We prove that RSU(3) is equivariantly formal for all S and compute its equivariant cohomology. . We also produce conjectural betti number formulas for some other Lie groups.