On certain multiple Bailey, Rogers and Dougall type summation formulas

Abstract

A multidimensional generalization of Bailey's very-well-poised bilateral basic hypergeometric 66 summation formula and its Dougall type 5H5 hypergeometric degeneration for q 1 is studied. The multiple Bailey sum amounts to an extension corresponding to the case of a nonreduced root system of certain summation identities associated to the reduced root systems that were recently conjectured by Aomoto and Ito and proved by Macdonald. By truncation, we obtain multidimensional analogues of the very-well-poised unilateral (basic) hypergeometric Rogers 6φ5 and Dougall 5F4 sums (both nonterminating and terminating). The terminating sums may be used to arrive at product formulas for the norms of recently introduced (q-)Racah polynomials in several variables.

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