Add to ORKGWe start with a discussion of CM abelian varieties in characteristic zero, and in positive characteristic. An abelian variety over a finite field is a CM abelian variety, as Tate proved. Can it be CM lifted to characteristic zero? Here are other questions. Does there exist an abelian variety, say over Qa, or over Fp, of dimension g > 3 not isogenous with the Jacobian of an algebraic curve? Can we construct algebraic curves, say over C, where the Jacobian is a CM abelian variety? We give (partial) answers to these questions and discuss stratifications and foliations of moduli spaces of abelian varieties in positive characteristic
We prove that in positive characteristic, the Manin–Mumford conjecture implies the Mordell–Lang conj...
Gael: Luminy 21 - 25 March 2005 We could try to classify isomorphism classes of abelian varieties. ...
We give a new proof of the Mordell–Lang conjecture in positive characteristic, in the situation wher...
In this note we prove that a principally polarized abelian variety of dimension g ≤ 3 is the canonic...
In this note we prove that a principally polarized abelian variety of dimension g ≤ 3 is the canonic...
Over a field of positive characteristic p, we consider moduli spaces of polarized abelian varieties ...
(0.1) Question Given an abelian variety A; does there exist an algebraic curve C such that there is...
Introduction (0.1) Question Given an abelian variety A; does there exist an algebraic curve C such t...
In this talk we discuss the question whether any abelian variety A0 defined over a finite field κ = ...
AbstractWe prove that any abelian variety with CM by OL of characteristic p is defined over a finite...
We define a notion of Weyl CM points in the moduli space A g,1 of g -dimensional principally polariz...
Consider a smooth projective variety over a number field. The image of the associated (complex) Abel...
Abstract We prove the existence of an abelian variety A of dimension g over Q that is not isogenous ...
AbstractWe prove that any abelian variety with CM by OL of characteristic p is defined over a finite...
Let k be an algebraically closed field of characteristic p > 0. We give a birational characterizatio...
We prove that in positive characteristic, the Manin–Mumford conjecture implies the Mordell–Lang conj...
Gael: Luminy 21 - 25 March 2005 We could try to classify isomorphism classes of abelian varieties. ...
We give a new proof of the Mordell–Lang conjecture in positive characteristic, in the situation wher...
In this note we prove that a principally polarized abelian variety of dimension g ≤ 3 is the canonic...
In this note we prove that a principally polarized abelian variety of dimension g ≤ 3 is the canonic...
Over a field of positive characteristic p, we consider moduli spaces of polarized abelian varieties ...
(0.1) Question Given an abelian variety A; does there exist an algebraic curve C such that there is...
Introduction (0.1) Question Given an abelian variety A; does there exist an algebraic curve C such t...
In this talk we discuss the question whether any abelian variety A0 defined over a finite field κ = ...
AbstractWe prove that any abelian variety with CM by OL of characteristic p is defined over a finite...
We define a notion of Weyl CM points in the moduli space A g,1 of g -dimensional principally polariz...
Consider a smooth projective variety over a number field. The image of the associated (complex) Abel...
Abstract We prove the existence of an abelian variety A of dimension g over Q that is not isogenous ...
AbstractWe prove that any abelian variety with CM by OL of characteristic p is defined over a finite...
Let k be an algebraically closed field of characteristic p > 0. We give a birational characterizatio...
We prove that in positive characteristic, the Manin–Mumford conjecture implies the Mordell–Lang conj...
Gael: Luminy 21 - 25 March 2005 We could try to classify isomorphism classes of abelian varieties. ...
We give a new proof of the Mordell–Lang conjecture in positive characteristic, in the situation wher...