Bivariance, Grothendieck duality and Hochschild homology

Abstract

A procedure for constructing bivariant theories by means of Grothendieck duality is developed. This produces, in particular, a bivariant theory of Hochschild (co)homology on the category of schemes that are flat, separated and essentially of finite type over a fixed noetherian scheme S. The theory takes values in the category of symmetric graded modules over the graded-commutative ring i Hi(S,OS). In degree i, the cohomology and homology H0(S,OS)-modules thereby associated to such an x: X -> S, with Hochschild complex Hx, are Exti(Hx, Hx) and Ext-i(Hx, x!OS). This lays the foundation for a sequel that will treat orientations in bivariant Hochschild theory through canonical relative fundamental class maps, unifying and generalizing previously known manifestations, via differential forms, of such maps.