Cancellation of vector bundles of rank 3 with trivial Chern classes on smooth affine fourfolds

Abstract

If n 0,1~mod~4, we prove a sum formula Vθ0 (a0,aRn) = n · Vθ0 (a0,aR) for the generalized Vaserstein symbol whenever R is a smooth affine algebra over a perfect field k with char(k) ≠ 2 such that -1 ∈ k×2. This enables us to generalize a result of Fasel-Rao-Swan on transformations of unimodular rows via elementary matrices over normal affine algebras of dimension d ≥ 4 over algebraically closed fields of characteristic ≠ 2. As a consequence, we prove that any projective module of rank 3 with trivial Chern classes over a smooth affine algebra of dimension 4 over an algebraically closed field k with char(k) ≠ 2,3 is cancellative.