Smooth affine group schemes over the dual numbers

Abstract

We provide an equivalence between the category of affine, smooth group schemes over the ring of generalized dual numbers k[I], and the category of extensions of the form 1 → Lie(G, I) → E → G → 1 where G is an affine, smooth group scheme over k. Here k is an arbitrary commutative ring and k[I] = k I with I2 = 0. The equivalence is given by Weil restriction, and we provide a quasi-inverse which we call Weil extension. It is compatible with the exact structures and the Ok-module stack structures on both categories. Our constructions rely on the use of the group algebra scheme of an affine group scheme; we introduce this object and establish its main properties. As an application, we establish a Dieudonn\'e classification for smooth, commutative, unipotent group schemes over k[I].