The Clebsch--Gordan coefficients of U(sl2) and the Terwilliger algebras of Johnson graphs

Abstract

The universal enveloping algebra U(sl2) of sl2 is a unital associative algebra over C generated by E,F,H subject to the relations align* [H,E]=2E, [H,F]=-2F, [E,F]=H. align* The element =EF+FE+H22 is called the Casimir element of U(sl2). Let :U(sl2) U(sl2) U(sl2) denote the comultiplication of U(sl2). The universal Hahn algebra H is a unital associative algebra over C generated by A,B,C and the relations assert that [A,B]=C and each of align* [C,A]+2A2+B, [B,C]+4BA+2C align* is central in H. Inspired by the Clebsch--Gordan coefficients of U(sl2), we discover an algebra homomorphism : H U(sl2) U(sl2) that maps eqnarray* A & & H 1-1 H4, \\ B & & ()2, \\ C & & E F-F E. eqnarray* By pulling back via any U(sl2) U(sl2)-module can be considered as an H-module. For any integer n≥ 0 there exists a unique (n+1)-dimensional irreducible U(sl2)-module Ln up to isomorphism. We study the decomposition of the H-module Lm Ln for any integers m,n≥ 0. We link these results to the Terwilliger algebras of Johnson graphs. We express the dimensions of the Terwilliger algebras of Johnson graphs in terms of binomial coefficients.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…