Serre's Conjectures on the Number of Rational Points of Bounded Height - Per Salberger
Elliptic Curves - Lecture 24b - The canonical height
Philipp Habegger: The Number of Rational Points on a Curve of Genus at Least Two
Weil conjectures 4 Fermat hypersurfaces
Serre weight conjectures in higher dimension
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part2)
Elliptic Curves - Lecture 23b - Heights and the descent theorem
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part4)
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part1)
Carlo Gasbarri: Arithmetic of algebraic points on varieties over function fields - Part 1
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part3)
Lecture 2 | Arithmetic on rationally connected varieties: rational points and zero-cycles
William Craig--Variants of Lehmer's conjecture
Harry Schmidt: Counting rational points and lower bounds for Galois orbits [...] (NTWS 117)
Serre’s problem for diagonal conics - Sofos - Workshop 1 - CEB T2 2019
Damaris Schindler: Density of rational points near manifolds (NTWS 199)
A. Chambert-Loir - Equidistribution theorems in Arakelov geometry and Bogomolov conjecture (part3)
Santiago Arango Piñeros - Zeta Functions and the Weil Conjectures
Serre's Conjecture for GL_2 over Totally Real Fields (Lecture 3) by Fred Diamond
Explicit Serre Weight Conjectures -Florian Herzig
![Harry Schmidt: Counting rational points and lower bounds for Galois orbits [...] (NTWS 117)](https://img.youtube.com/vi/bxaRASdvNCI/0.jpg)
