Explore the intricate world of foliations on Shimura varieties in this comprehensive lecture by Eyal Goren from McGill University. Delve into the Theta Series, examining its connections to representation theory, geometry, and arithmetic. Begin with an introduction to foliations and their motivations, then progress to inseparable morphisms and foliations in characteristic P. Analyze the theorem and obstruction related to V-foliations, and examine specific examples of surfaces, including M0P. Conclude with a discussion on the general case, providing a thorough understanding of this complex mathematical topic.
Overview
Syllabus
Introduction
Foliations
Motivation
In inseparable morphisms
Foliations in characteristic P
Theorem
Obstruction
Vfoliations
Example of surfaces
M0P
General Case
Taught by
Fields Institute
