Abelian surfaces good away from 2

Abstract

Fix a number field k and a rational prime . We consider abelian varieties whose -power torsion generates a pro- extension of k(μ∞) which is unramified away from . It is a necessary, but not generally sufficient, condition that such varieties have good reduction away from . In the special case of = 2, we demonstrate that for abelian surfaces A/Q, good reduction away from does suffice. The result is extended to elliptic curves and abelian surfaces over certain number fields unramified away from \2,∞\. An explicit example is constructed to demonstrate that good reduction is not sufficient, at = 2, for abelian varieties of sufficiently high dimension.