Birational characterization of abelian varieties and ordinary abelian varieties in characteristic p>0

Let k be an algebraically closed field of characteristic p > 0. We give a birational characterization of ordinary abelian varieties over k: a smooth projective variety X is birational to an ordinary abelian variety if and only if kappa(S)(X) = 0 and b(1)(X) = 2 dimX. We also give a similar characterization of abelian varieties as well: a smooth projective variety X is birational to an abelian variety if and only if kappa(X) = 0, and the Albanese morphism a : X -> A is generically finite. Along the way, we also show that if kappa(S)(X) = 0 ( or if kappa(X) = 0 and a is generically finite), then the Albanese morphism a : X -> A is surjective and in particular dim A

Birational characterization of abelian varieties and ordinary abelian varieties in characteristic p>0

Arithmetic and geometric deformations of threefolds

The Nonvanishing Problem for varieties with nef anticanonical bundle

NORM TORI OF ETALE ALGEBRAS AND UNRAMIFIED BRAUER GROUPS

Arithmetic and geometric deformations of threefolds

The Nonvanishing Problem for varieties with nef anticanonical bundle

NORM TORI OF ETALE ALGEBRAS AND UNRAMIFIED BRAUER GROUPS