Some new homology and cohomology theories of manifolds and orbifolds

Abstract

For each manifold or effective orbifold Y and commutative ring R, we define a new homology theory MH*(Y;R), M-homology, and a new cohomology theory MH*(Y;R), M-cohomology. For MH*(Y;R) the chain complex (MC*(Y;R),∂) is generated by quadruples [V,n,s,t] satisfying relations, where V is an oriented manifold with corners, n∈ N, and s:V Rn, t:V Y are smooth with s proper near 0 in Rn. We show that MH*(Y;R),MH*(Y;R) satisfy the Eilenberg-Steenrod axioms, and so are canonically isomorphic to conventional (co)homology. The usual operations on (co)homology -- pushforwards f*, pullbacks f*, fundamental classes [Y] for compact oriented Y, cup, cap and cross products ,,× -- are all defined and well-behaved at the (co)chain level. Chains MC*(Y;R) form flabby cosheaves on Y, and cochains MC*(Y;R) form soft sheaves on Y, so they have good gluing properties. We also define compactly-supported M-cohomology MH*cs(Y;R), locally finite M-homology MH*lf(Y;R) (a kind of Borel-Moore homology), and two variations on the entire theory, rational M-(co)homology and de Rham M-(co)homology. All of these are canonically isomorphic to the corresponding type of conventional (co)homology. The reason for doing this is that our M-(co)homology theories are very well behaved at the (co)chain level, and will be better than other (co)homology theories for some purposes, particularly in problems involving transversality. In a sequel we will construct virtual classes and virtual chains for Kuranishi spaces in M-(co)homology, with a view to applications of M-(co)homology in areas of Symplectic Geometry involving moduli spaces of J-holomorphic curves.