Lecture

Group Theory Basics

Description

This lecture covers the fundamental concepts of group theory, starting with the definition of a group as a set equipped with a binary operation, an inverse operation, and an identity element. Examples include the group of real numbers under addition and the symmetric group. Subgroups are introduced as subsets of a group that satisfy the group axioms. Homomorphisms between groups are discussed, along with automorphisms and their properties.

Instructor

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Official source

https://mediaspace.epfl.ch/media/0_9wtgc1c1

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Ontological neighbourhood

Mathematics

Algebra: Representation theory, Abstract algebra

Theoretical computer science

Algorithms and data structures: Analysis of algorithms

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