An imperceptible connection between the Clebsch--Gordan coefficients of Uq(sl2) and the Terwilliger algebras of Grassmann graphs

Abstract

The Clebsch--Gordan coefficients of U(sl2) are expressible in terms of Hahn polynomials. The phenomenon can be explained by an algebra homomorphism from the universal Hahn algebra H into U(sl2) U(sl2). Let denote a finite set of size D and 2 denote the power set of . It is generally known that C2 supports a U(sl2)-module. Let k denote an integer with 0≤ k≤ D and fix a k-element subset x0 of . By identifying C2 with C2 x0 C2x0 this induces a U(sl2) U(sl2)-module structure on C2 denoted by C2(x0). Pulling back via the U(sl2) U(sl2)-module C2(x0) forms an H-module. When 1≤ k≤ D-1 the H-module C2(x0) enfolds the Terwilliger algebra of the Johnson graph J(D,k) with respect to x0. This result connects these two seemingly irrelevant topics: The Clebsch--Gordan coefficients of U(sl2) and the Terwilliger algebras of Johnson graphs. Unfortunately some steps break down in the q-analog case. By making detours, the imperceptible connection between the Clebsch--Gordan coefficients of Uq(sl2) and the Terwilliger algebras of Grassmann graphs is successfully disclosed in this paper.