Young Diagrams and Classical Groups

Abstract

Young diagrams are ubiquitous in combinatorics and representation theory. Here we explain these diagrams, focusing on how they are used to classify representations of the symmetric groups Sn and various "classical groups": famous groups of matrices such as the general linear group GL(n,C) consisting of all invertible n × n complex matrices, the special linear group SL(n,C) consisting of all n × n complex matrices with determinant 1, the group U(n) consisting of all unitary n × n matrices, and the special unitary group SU(n) consisting of all unitary n × n matrices with determinant 1. We also discuss representations of the full linear monoid consisting of all linear transformations of Cn. These notes, based on the column This Week's Finds in Mathematical Physics, are made to accompany a series of lecture videos.