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January 26, 2016 14:00–15:00, Seminar on Algebra, Geometry and Physics, Max Planck Institute for Mathematics
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The many faces of the elliptic beta integral
V. P. Spiridonovab a Max Planck Institute for Mathematics
b Joint Institute for Nuclear Research, Bogoliubov Laboratory of Theoretical Physics
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Abstract:
The elliptic beta integral, a contour integral of a particular product
of elliptic gamma functions, admits an explicit evaluation. This
formula represents (i) an elliptic binomial theorem, (ii) top known
univariate extension of the Euler beta integral, (iii) a germ for building
an elliptic analogue of the Euler-Gauss hypergeometric function
and of very many elliptic hypergeometric integrals on root systems,
(iv) a normalization of the measure for biorthogonal functions comprising
all classical systems of orthogonal functions, (v) an integral operator
realization of the Coxeter relations of a permutation group,
(vi) a confinement criterion in a four-dimensional supersymmetric
quantum field theory. After a brief explanation of the above points,
I'll discuss a recent proposal by Kels of an extension of this identity
by addition of discrete parameters related to the lens spaces.
Language: English
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