The geometric interpretation of some mathematical expressions containing the Riemann ζ-function
DOI: 441 Downloads 8000 Views
Author(s)
Abstract
The article discusses some of the mathematical results widely used in practice which contain the Riemann ζ-function, and, at first glance, are in contradiction with common sense. A geometric approach is suggested, based on the concept of the curvature of space, in which is calculated an algorithm that specifies the representation of ζ -function as an infinite diverging series. The analysis is based on the use of Einstein equations to calculate the metric of curved space.
Keywords
Riemann ζ-function, Einstein equations, metric, metric tensor, energy-momentum tensor, Christoffel symbols, algorithm
Cite this paper
Yu. N. Zayko,
The geometric interpretation of some mathematical expressions containing the Riemann ζ-function
, SCIREA Journal of Mathematics.
Volume 1, Issue 1, October 2016 | PP. 184-189.
References
[ 1 ] | Zwiebach B. A First Course in String Theory, 2-nd Ed., MIT.- 2009. |
[ 2 ] | Janke E., Emde F, Lösch F., Tafeln Höherer Funktionen, B.G. Teubner Verlagsgeselschaft, Stuttgart, 1960. |
[ 3 ] | Hardy G.H. Divergent series.-Oxford, 1949. |
[ 4 ] | Eiler L. Differential Calculation.- Academy Pub., St. Petersburg.- 1755. |
[ 5 ] | Landau L.D., Lifshitz E.M., The Classical Theory of Fields. Vol. 2 (4th ed.). Butterworth-Heinemann, 1975. |
[ 6 ] | Maxwell’s Demon 2. Entropy, Classical and Quantum Information, Computing. Ed. by Leff H.S., and Rex A.F., IoP Publishing, 2003. |
[ 7 ] | Prudnikov A. P., Brychkov Yu. A., and Marichev O. I., Integrals and Series, vols. 1–3; Gordon and Breach, New York, 1986, 1986, 1989. |