Relative compactifications of semiabelian N\'eron models, I

Abstract

Let R be a complete discrete valuation ring, k(η) its fraction field, S:= Spec R, (Gη,Lη) a polarized abelian variety over k(η) with Lη ample cubical and G the N\'eron model of Gη over S. Suppose that G is totally degenerate semiabelian over S. Then there exists a (unique) relative compactification (P,N) of G such that (α) P is Cohen-Macaulay with codimP(P) = 2 and (β) N is ample invertible with N|G cubical and Nη=L nη for some positive integer n.