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We prove a pair of transformations relating elliptic hypergeometric integrals of different dimensions, corresponding to the root systems BC n and A n ; as a special case, we recover some integral identities conjectured by van Diejen and Spiridonov. For BC n , we also consider their "Type II" integral. Their proof of that integral, together with our transformation, gives rise to pairs of adjoint integral operators; a different proof gives rise to pairs of adjoint difference operators. These allow us to construct a family of biorthogonal abelian functions generalizing the Koornwinder polynomials, and satisfying the analogues of the Macdonald conjectures. Finally, we discuss some transformations of Type II-style integrals. In particular, we find that adding two parameters to the Type II integral gives an integral invariant under an appropriate action of the Weyl group E 7 .
Eric M. Rains (Wed,) studied this question.