Andreatta, Fabrizio (1972-.... ; mathématicien)
- Mathématiques
- Grenoble
- Arakelov Geometry and diophantine applications
- eem2017
- Géométrie d'Arakelov et applications diophantiennes
- height
- CM points
- Shimura varieties
- Colmez conjecture
- Grenoble
- Arakelov Geometry and diophantine applications
- eem2017
- Géométrie d'Arakelov et applications diophantiennes
- height
- CM points
Vidéos
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part4)
We will first introduce Shimura varieties of orthogonal type, their Heegner divisors and some special points, called CM (Complex Multiplication) points. Secondly we will review conjectures of
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part5)
We will first introduce Shimura varieties of orthogonal type, their Heegner divisors and some special points, called CM (Complex Multiplication) points. Secondly we will review conjectures of
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part3)
We will first introduce Shimura varieties of orthogonal type, their Heegner divisors and some special points, called CM (Complex Multiplication) points. Secondly we will review conjectures of
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part1)
We will first introduce Shimura varieties of orthogonal type, their Heegner divisors and some special points, called CM (Complex Multiplication) points. Secondly we will review conjectures of
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part2)
We will first introduce Shimura varieties of orthogonal type, their Heegner divisors and some special points, called CM (Complex Multiplication) points. Secondly we will review conjectures of