Eric Rains, Simon Ruijsenaars
The Sklyanin algebra $S_{\eta}$ has a well-known family of infinite-dimensional representations $D(\mu)$, $\mu \in C^*$, in terms of difference operators with shift $\eta$ acting on even meromorphic functions. We show that for generic $\eta$ the coefficients of these operators have solely simple poles, with linear residue relations depending on their locations. More generally, we obtain explicit necessary and sufficient conditions on a difference operator for it to belong to $D(\mu)$. By definition, the even part of $D(\mu)$ is generated by twofold products of the Sklyanin generators. We prove that any sum of the latter products yields a difference operator of van Diejen type. We also obtain kernel identities for the Sklyanin generators. They give rise to order-reversing involutive automorphisms of $D(\mu)$, and are shown to entail previously known kernel identities for the van Diejen operators. Moreover, for special $\mu$ they yield novel finite-dimensional representations of $S_{\eta}$.
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http://arxiv.org/abs/1203.0042
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