Dual Polynomials of the Multi-Indexed (q-)Racah Orthogonal Polynomials

Abstract

We consider dual polynomials of the multi-indexed (q-)Racah orthogonal polynomials. The M-indexed (q-)Racah polynomials satisfy the second order difference equations and various 1+2L (L≥ M+1) term recurrence relations with constant coefficients. Therefore their dual polynomials satisfy the three term recurrence relations and various 2L-th order difference equations. This means that the dual multi-indexed (q-)Racah polynomials are ordinary orthogonal polynomials and the Krall-type. We obtain new exactly solvable discrete quantum mechanics with real shifts, whose eigenvectors are described by the dual multi-indexed (q-)Racah polynomials. These quantum systems satisfy the closure relations, from which the creation/annihilation operators are obtained, but they are not shape invariant.