Summer School on Group Representation Theory
Imam Khomeini International University,
Qazvin, Iran, 31st Aug - 9th Sep 2022
Course: Modular Representation Theory of Finite Groups
Lecturer: Jun.-Prof. Dr. Caroline Lassueur (TU Kaiserslautern)
Abstract
Modular representation theory is the study of representations of groups and related algebras over fields of positive characteristic. It was initially developed by R. Brauer, with a view towards the structure of finite groups. The aim of this mini-course is two-fold: first, provide the participants with an introduction to this topic with a focus on finite groups, and second, investigate the connections between ordinary and modular representation theory.
The first part of the course we will review basic notions: representations, characters, the group algebra and its modules, modular systems, Brauer characters, vertices and sources, block algebras.
The second part will focus on current research problems in block theory. We will investigate different types of categorical equivalences between blocks of finite groups and describe their numerical and group-theoretical invariants. Finally, we will review fundamental open problems and deep conjectures moving the topic forward.
Preliminary Reading
Notes and Handouts
- MONDAY:
- Introduction
- Lecture 1 (Chap. 1: Representations of Finite Groups / Chap. 2: Simplicity and Semisimplicity)
- TUESDAY: Lecture 2 (Chapter 3: Indecomposable Modules)
- WEDNESDAY: Lecture 3 (Chapter 4: Brauer Characters and p-Modular Systems, Chapter 5: Equivalences of Block Algebras)
Lecture Notes will be uploaded here at the end of each lecture.
- MONDAY: Lecture 1 (Chap. 1: Representations of Finite Groups / Chap. 2: Simplicity and Semisimplicity)
- TUESDAY: Lecture 2 (Chapter 3: Indecomposable Modules)
- WEDNESDAY: Lecture 3 (Chapter 4: p-modular systems and Brauer Characters, Chapter 5: Block Theory)
FULL TEXT
