Salberger, Per (1957-....)
- Mathématiques
- Grenoble
- Arakelov Geometry and diophantine applications
- eem2017
- Géométrie d'Arakelov et applications diophantiennes
- quantitative aspects
- rational points
- algebraic varieties
- Grenoble
- Arakelov Geometry and diophantine applications
- eem2017
- Géométrie d'Arakelov et applications diophantiennes
- quantitative aspects
- rational points
- algebraic varieties
Vidéos
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part4)
Let X be a subvariety of Pn defined over a number field and N(B) be the number of rational points of height at most B on X. There are then general conjectures of Manin on the asymptotic behaviour
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part2)
Let X be a subvariety of Pn defined over a number field and N(B) be the number of rational points of height at most B on X. There are then general conjectures of Manin on the asymptotic behaviour
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part3)
Let X be a subvariety of Pn defined over a number field and N(B) be the number of rational points of height at most B on X. There are then general conjectures of Manin on the asymptotic behaviour
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part1)
Let X be a subvariety of Pn defined over a number field and N(B) be the number of rational points of height at most B on X. There are then general conjectures of Manin on the asymptotic behaviour