Add to ORKGLet Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the Jacobi variety of Z is an extension of a principally polarized abelian variety A(Z), with good reduction, by a torus. Using deformation theory of curves, one shows that A(Z) is in general not a product of Jacobian varieties
In this note we prove that a principally polarized abelian variety of dimension g ≤ 3 is the canonic...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
Let Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the J...
Let Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the J...
Let Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the J...
Let Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the J...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
Abstract. Let C be a projective irreducible non-singular curve over an algebraic closed field k of c...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
In this note we prove that a principally polarized abelian variety of dimension g ≤ 3 is the canonic...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
Let Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the J...
Let Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the J...
Let Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the J...
Let Z/K be a non-singular complete curve over a complete valued field K. The uniformization of the J...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
Abstract. Let C be a projective irreducible non-singular curve over an algebraic closed field k of c...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
In this note we prove that a principally polarized abelian variety of dimension g ≤ 3 is the canonic...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...
We give completely algebro-geometric proofs of a theorem by T. Shiota, and of a theorem by I. Kriche...