Racah problems for the oscillator algebra, the Lie algebra sln, and multivariate Krawtchouk polynomials

Abstract

The oscillator Racah algebra Rn(h) is realized by the intermediate Casimir operators arising in the multifold tensor product of the oscillator algebra h. An embedding of the Lie algebra sln-1 into Rn(h) is presented. It relates the representation theory of the two algebras. We establish the connection between recoupling coefficients for h and matrix elements of sln-representations which are both expressed in terms of multivariate Krawtchouk polynomials of Griffiths type.