Hasse Principle for Reductive Groups over P-Adic Function Fields
Offered By: International Centre for Theoretical Sciences via YouTube
Course Description
Overview
Explore the Hasse Principle for Reductive Groups over P-Adic Function Fields in this 58-minute lecture by Raman Parimala. Delivered as part of the "Zariski Dense Subgroups, Number Theory and Geometric Applications" program at the International Centre for Theoretical Sciences, delve into advanced topics in algebraic number theory and arithmetic theory of algebraic groups. Gain insights into recent developments in the field, including applications to algebraic and differential geometry, combinatorics, and other areas. Examine open problems and future research directions while learning about techniques used to investigate Zariski-dense subgroups. Connect with experts in algebraic and Lie groups, differential and algebraic geometry, and related fields through this comprehensive program designed to showcase progress in the theory of arithmetic and Zariski-dense subgroups over the past decade.
Syllabus
Hasse Principle for Reductive Groups over P-Adic Function Fields by Raman Parimala
Taught by
International Centre for Theoretical Sciences
Related Courses
Representations of Reductive Groups Over Local FieldsInternational Mathematical Union via YouTube Generic Character Sheaves for Parahoric Subgroups
Hausdorff Center for Mathematics via YouTube Symmetric Closed Subsets of Real Affine Root Systems and Regular Su - Short Talk by Irfan Habib
International Centre for Theoretical Sciences via YouTube Representations of Extended Affine Lie Algebras by Senapathi Eswara Rao
International Centre for Theoretical Sciences via YouTube From Faces of Weyl Polytopes, to Weights and Characters of Highest Weight Modules by Apoorva Khare
International Centre for Theoretical Sciences via YouTube