An analog of the Dougall formula and of the de Branges--Wilson integral
Abstract
We derive a beta-integral over Z× R , which is a counterpart of the Dougall 5H5-formula and of the de Branges--Wilson integral, our integral includes 10H10-summation. For a derivation we use a two-dimensional integral transform related to representations of the Lorentz group, this transform is a counterpart of the Olevskii index transform (a synonym: Jacobi transform).
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