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Some relations for universal Bernoulli polynomials
M. C. Dağlı Department of Mathematics, Akdeniz University, Dumlupınar Boulevard, 07058 Campus, Antalya, Turkey
Abstract:
In this paper, we consider a generalization of the
Bernoulli polynomials, which we call universal Bernoulli polynomials. They are
related to the Lazard universal formal group. The corresponding numbers
by construction coincide with the universal Bernoulli numbers. They turn out
to have an important role in complex cobordism theory. They also obey
generalizations of the celebrated Kummer and Clausen–von Staudt congruences.
We derive a formula on the integral of products of higher-order universal
Bernoulli polynomials. As an application of this formula, the Laplace
transform of periodic universal Bernoulli polynomials is presented. Moreover,
we obtain the Fourier series expansion of higher-order universal Bernoulli
function.
Keywords:
Bernoulli polynomials and numbers, formal group, integrals, Fourier series.
Received: 28.01.2019
Citation:
M. C. Dağlı, “Some relations for universal Bernoulli polynomials”, Ufa Math. J., 11:4 (2019), 131–139
Linking options:
https://www.mathnet.ru/eng/ufa497https://doi.org/10.13108/2019-11-4-131 https://www.mathnet.ru/eng/ufa/v11/i4/p130
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