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Real Reductive Groups, K-Theory and the Oka Principle

Offered By: Hausdorff Center for Mathematics via YouTube

Tags

K Theory Courses Representation Theory Courses Langlands Program Courses

Course Description

Overview

Explore a comprehensive lecture on real reductive groups, K-theory, and the Oka principle delivered by Nigel Higson at the Hausdorff Center for Mathematics. Delve into the intricate world of mathematical concepts as part of the Follow-up Workshop TP Rigidity. Over the course of 70 minutes, gain insights into problems with K-theory, real reductive groups, and the Harris children algebra. Examine the Bank on conjecture, investigate K-theory applications, and explore connections to Langlands program and representation theory. Discover how these concepts relate to the complex plane, and conclude with a summary and discussion of the final object. Enhance your understanding of advanced mathematical topics and their interconnections in this in-depth presentation.

Syllabus

Introduction
Problems with Ktheory
Real reductive groups
Harris children algebra
Bank on conjecture
K theory
Langlands
Representation theory
Complex plane
Summary
Final object


Taught by

Hausdorff Center for Mathematics

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