Lifting vector bundles to Witt vector bundles

Abstract

Let X be a scheme. Let r ≥ 2 be an integer. Denote by Wr(X) the scheme of Witt vectors of length r, built out of X. We are concerned with the question of extending (=lifting) vector bundles on X, to vector bundles on Wr(X)-promoting a systematic use of Witt modules and Witt vector bundles. To begin with, we investigate two elementary but significant cases, in which the answer to this question is positive: line bundles, and the tautological vector bundle of a projective bundle over an affine base. We then offer a simple (re)formulation of classical results in deformation theory of smooth varieties over a field k of characteristic p>0, and extend them to reduced k-schemes. Some of these results were recently recovered, in another form, by Stefan Schr\"oer. As an application, we prove that the tautological vector bundle of the Grassmannian GrFp(m,n) does not extend to W2(GrFp(m,n)), if 2 ≤ m ≤ n-2. To conclude, we establish a connection to the work of Zdanowicz, on non-liftability of some projective bundles.