A Base Change Version of Rasmussen-Tamagawa Conjecture

Abstract

We prove a certain uniform version of the Shafarevich Conjecture. As a corollary, we prove the Rasmussen-Tamagawa Conjecture for a particular class of abelian varieties A defined over a number K of dimension g having everywhere potential good reduction, in particular, for any finite place v of K the localization Av:=A×Spec(K)Spec(Kv) has either good reduction or totally bad reduction (connected component Av0 of the special fibre Av of the N\'eron model Av at v is an affine group scheme over the residue field kv at v) and has good reduction over a quadratic extension of Kv.