Witt, GW, K-theory of quasi-projective schemes

Abstract

In this article we continue our investigation of the Derived Equivalences over noetherian quasi-projective schemes X, over affine schemes A. For integers k≥ 0, let C Mk(X) denote the category of coherent X-modules F, with locally free dimension proj()=k=grade( F). We prove that there is a zig-zag equivalence Db(C Mk(X)) Dk( V(X)) of the derived categories. It follows that there is a sequence of zig-zag maps K(C Mk+1(X)) K(C Mk(X)) x∈ X(k) K(C Mk(Xx)) \\ of the -theory spectra that is a homotopy fibration. In fact, this is analogous to the fibrations of the G-theory spaces of Quillen (see proof of [Theorem 5.4]Q). We also establish similar homotopy fibrations of GW-spectra and GW-bispectra.