Algebraic interpretation of the two-variable Jacobi polynomials on the triangle: the pentagonal way

Abstract

The rank two Jacobi algebra J2 is used to provide an interpretation of the two-variable Jacobi polynomials Jn,k(a,b,c)(x,y) on the triangle, as overlaps between two representation bases. The subalgebra structure of J2 depicted via a pentagonal graph is exploited to find the explicit expression of the two-variable functions in terms of univariate Jacobi polynomials. It is also seen to provide an explanation for the fact that the expansion on the basis Jn,k(a,b,c)(x,y) of the polynomials obtained from the latter by permuting the variables x,y, z=1-x-y and the parameters (a,b,c) is given in terms of Racah polynomials. The underlying order-three symmetry is discussed.