![Pentagon axiom diagram Pentagon axiom diagram](/courses/mathematics/18-769-topics-in-lie-theory-tensor-categories-spring-2009/18-769s09.jpg)
The pentagon axiom is commutative for all objects W, X, Y, Z, in C. (Image by MIT OpenCourseWare.)
Instructor(s)
Prof. Pavel Etingof
MIT Course Number
18.769
As Taught In
Spring 2009
Level
Graduate
Course Description
Course Features
Course Description
This course will give a detailed introduction to the theory of tensor categories and review some of its connections to other subjects (with a focus on representation-theoretic applications). In particular, we will discuss categorifications of such notions from ring theory as: module, morphism of modules, Morita equivalence of rings, commutative ring, the center of a ring, the centralizer of a subring, the double centralizer property, graded ring, etc.