Convergence of two obstructions for projective modules

Abstract

Let X=SpecA denote a regular affine scheme, over a field k, with 1/2∈ k and X=d. Let P denote a projective A-module of rank n≥ 2. Let π0( LO(P)) denote the (Nori) Homotopy Obstruction set, and CHn(X, nP) denote the Chow Witt group. In this article, we define a natural (set theoretic) map P: π0( LO(P)) CHn(X, nP) The main Results are included in my recently published book on Algebraic K-Theory.