P. Salberger - Quantitative aspects of rational points on algebraic varieties (part1)
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part3)
Counting rational points of cubic hypersurfaces - Salberger - Workshop 1 - CEB T2 2019
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part2)
P. Salberger - Quantitative aspects of rational points on algebraic varieties (part4)
Serre's Conjectures on the Number of Rational Points of Bounded Height - Per Salberger
p-adic approaches to rational points on curves - Poonen - Lecture 1/4 - CEB T2 2019
p-Adic Hodge Theory - Alexander Beilinson
Rational lines on cubic hypersurfaces - Brandes - Workshop 1 - CEB T2 2019
Counting points on projective hypersurfaces
Tutorial: Couple Series - Safe Haven Embrace
Homological branching law for general linear p-adic groups
Serre’s problem for diagonal conics - Sofos - Workshop 1 - CEB T2 2019
Weil conjectures 4 Fermat hypersurfaces
The zeta function: a mystery 283 years old
P-adic adelic metrics, P-adic heights, and rational points on curves by Padma Srinivasan
Crafoordpriset i matematik 2020
Z. Huang - Diophantine approximation and local distribution of rational points
Reducible fibers and monodromy of polynomial maps - Danny Neftin
Zeta function: Learning from trying
