Unirational algebraic groups and tame ramification

Abstract

Let OK be a complete discrete valuation ring with field of fractions K and algebraically closed residue field k. Let G be a smooth connected commutative algebraic group over K which does not contain a copy of Ga. For each d prime to p:=char\, k, let K(d) be the unique extension of K of degree d. We investigate how the N\'eron lft-model of G behaves under base change to the ring of integers OK(d). Information about this behaviour is encoded in the "jumps" of Edixhoven's filtration on the special fibre of the N\'eron lft-model of G, as well as in Halle-Nicaise's motivic zeta function of G. If G is unirational (e. g. an algebraic torus), we show that the jumps of G are rational numbers and that the motivic zeta function of G is a rational function. We also deduce analogous results for Abelian varieties with potentially totally multiplicative reduction. This answers a question of Halle-Nicaise and partially one of Edixhoven. Along the way, we answer a question of Oesterl\'e about the structure of unipotent algebraic groups over function fields in positive characteristic. Under stronger conditions on G, we obtain rationality of jumps even for separably closed but imperfect k.