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On applications of the dihedral group to interpolation problems for entire functions
F. N. Garif'yanova, E. V. Strezhnevab a Kazan State Power Engineering University, 51 Krasnosel’skaya street, Kazan 420066, Russia
b Kazan National Research Technical University named after A. N. Tupolev, 10 K. Marx street, Kazan, 42011, Russia
Abstract:
We consider a particular case of the dihedral group of rotations and study linear poly-element functional equations associated with that group. We search for a solution in the class of functions that are holomorphic in the plane with a cut along “half” of the boundary of its fundamental region and vanish at infinity. We suggest a method for the regularization of such equations based on the theory of the Carleman boundary-value problem. The inverse involutive shift is induced by the generating transformations of the group. The solution is searched in the form of a Cauchy-type integral with an unknown density. The solution is a lower function that is Borel-associated with a certain entire function of exponential type (upper function).
Keywords:
properly discontinuous groups, regularization method, entire functions.
Received: 17.04.2023 Revised: 25.07.2023 Accepted: 04.08.2023
Citation:
F. N. Garif'yanov, E. V. Strezhneva, “On applications of the dihedral group to interpolation problems for entire functions”, Probl. Anal. Issues Anal., 12(30):3 (2023), 41–49
Linking options:
https://www.mathnet.ru/eng/pa382 https://www.mathnet.ru/eng/pa/v30/i3/p41
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Abstract page: | 47 | Full-text PDF : | 21 | References: | 22 |
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