Johnson graphs as slices of a hypercube and an algebra homomorphism from the universal Racah algebra into U(sl2)

Abstract

From the viewpoint of Johnson graphs as slices of a hypercube, we derive a novel algebra homomorphism from the universal Racah algebra into U(sl2). We use the Casimir elements of to describe the kernel of . By pulling back via every U(sl2)-module can be viewed as an -module. We show that for any finite-dimensional U(sl2)-module V, the -module V is completely reducible and three generators of act on every irreducible -submodule of V as a Leonard triple. In particular, Leonard triples can be constructed in terms of the second dual distance operator of the hypercube H(D,2) and a decomposition of the second distance operator of H(D,2) induced by Johnson graphs.