Quadrature formulas with exponential convergence and calculation of the Fermi–Dirac integrals
- Авторы: Kalitkin N.1, Kolganov S.2
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Учреждения:
- Keldysh Institute of Applied Mathematics
- National Research University of Electronic Technology (MIET)
- Выпуск: Том 95, № 2 (2017)
- Страницы: 157-160
- Раздел: Mathematics
- URL: https://journals.rcsi.science/1064-5624/article/view/224929
- DOI: https://doi.org/10.1134/S1064562417020156
- ID: 224929
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Аннотация
A class of functions for which the trapezoidal rule has superpower convergence is described: these are infinitely differentiable functions all of whose odd derivatives take equal values at the left and right endpoints of the integration interval. An heuristic law is revealed; namely, the convergence exponentially depends on the number of nodes, and the exponent equals the ratio of the length of integration interval to the distance from this interval to the nearest pole of the integrand. On the basis of the obtained formulas, a method for calculating the Fermi–Dirac integrals of half-integer order is proposed, which is substantially more economical than all known computational methods. As a byproduct, an asymptotics of the Bernoulli numbers is found.
Об авторах
N. Kalitkin
Keldysh Institute of Applied Mathematics
Автор, ответственный за переписку.
Email: kalitkin@imamod.ru
Россия, Moscow, 125047
S. Kolganov
National Research University of Electronic Technology (MIET)
Email: kalitkin@imamod.ru
Россия, Zelenograd, Moscow, 124498