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Complex Approximations, Orthogonal Polynomials and Applications (CAOPA)
October 12, 2020 18:00, Moscow, online via Zoom
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Degenerations of the elliptic analogue of Euler–Gauss hypergeometric function
V. P. Spiridonovab a National Research University "Higher School of Economics", Moscow
b Joint Institute for Nuclear Research, Bogoliubov Laboratory of Theoretical Physics, Dubna, Moscow Region
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Abstract:
The elliptic analogue of Euler–Gauss hypergeometric function depends on two complex moduli $p$ and $q$ and seven parameters $t_j$. We consider its various degeneration limits. For fixed parameters, in the simplest $p=0$ limit one gets Rahman's (unit circle) integral representation for a combination of two non-terminating ${}_{10}\varphi_9$ $q$-hypergeometric series. In the limit, when all $p$, $q$ and $t_j$ simulataneously tend to $1$, one gets the hyperbolic (Mellin–Barnes type) integral expressed in terms of Faddeev's quantum dilogarithm (the hyperbolic gamma function). Both these limiting integrals are degenerated for $q=1$ to special ${}_9F_8$ hypergeometric functions. However, the hyperbolic integrals have more intricate limits leading to infinite bilateral sums of the plain hypergeometric integrals, which will be a main emphasis of the talk. These are the Mellin–Barnes representations of complex hypergeometric functions related to principal series representations of the group $\mathrm{SL}(2,\mathbb{C})$. Thus, all known forms of classical hypergeometric functions are unified at the elliptic level to one unique object. The talk is partially based on recent joint works with Gor Sarkissian.
Language: English
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