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Trudy Moskovskogo Matematicheskogo Obshchestva, 2019, Volume 80, Issue 2, Pages 157–177
(Mi mmo624)
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This article is cited in 6 scientific papers (total in 6 papers)
Ordinary differential operators and the integral representation of sums of certain power series
K. A. Mirzoeva, T. A. Safonovab a Faculty of Mechanics and Mathematics, Moscow State University, Moscow, Russia
b Northern (Arctic) Federal University named after M. V. Lomonosov, Arkhangelsk, Russia
Abstract:
The explicit form of the eigenvalues and eigenfunctions is known for certain operators generated by symmetric differential expressions with constant coefficients and self-adjoint boundary conditions in the space of Lebesgue square-integrable functions on an interval, and their resolvents are known to be integral operators. According to the spectral theorem, the kernels of these resolvents satisfy a certain bilinear relation. Moreover, each such kernel is the Green's function of some self-adjoint boundary value problem and the method of constructing it is well known. Consequently, the Green's functions of these problems can be expanded in a series of eigenfunctions. In this paper, the identities obtained in this way are applied to construct an integral representation of sums of certain power series and special functions, and in particular, to evaluate sums of some converging number series.
Key words and phrases:
Green's function, polylogarithms and associated functions, integral representation of power series, Riemann $\zeta$-function, Euler digamma function.
Received: 15.04.2019
Citation:
K. A. Mirzoev, T. A. Safonova, “Ordinary differential operators and the integral representation of sums of certain power series”, Tr. Mosk. Mat. Obs., 80, no. 2, MCCME, M., 2019, 157–177; Trans. Moscow Math. Soc., 80 (2019), 133–151
Linking options:
https://www.mathnet.ru/eng/mmo624 https://www.mathnet.ru/eng/mmo/v80/i2/p157
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Abstract page: | 289 | Full-text PDF : | 111 | References: | 44 | First page: | 6 |
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