Various Series Concerning the Zeta Function

Abramowitz M., Stegun I.A., Handbook of mathematical functions: with formulas, graphs, and mathematical tables, Dover Books on Mathematics, 1964.

Bonar D.D and Kourym.M.J., Real infinite series, MAA, Washington DC, 2006.

Davis, H.T. 2015., The summation of series (Dover Books on Mathematics), Mineola, New York: Dover Publications. ISBN-13: 63 978-0486789682.

Edwards M.H., Riemann's zeta function, Dover Publications; Dover Ed edition, June 13, 2001.

Fabiano, N. Zeta function and some of its properties, Vojnotehni ˇcki glasnik/Military Technical Courier, 68(4), 895-906 (2020).

https://doi.org/10.5937/vojtehg68-28535

Furdui, O. Two surprising series with harmonic numbers and the tail of zeta(2), Gazeta Matematica, Seria A, 33(112)(1-2),1-8 (2005).

Grimaldi. R, Fibonacci and catalan numbers: An introduction, Wiley, March 13, 2012.

https://doi.org/10.1002/9781118159743

Hirschman I.I., Infinite series, Dover Publications, Reprint edition, October 15,2014.

Ivi ́c ,A., Topics in recent zeta function theory, Publications Math ́ematiques d'Orsay, Orsay, 1, iii+272 (1983).

Knopp, K. , Theory and applications of infinite series, Dover Publications, New York, 1990.

Lewin L., Polylogarithms and associated functions, Elsevier, North Holland, 1981.

Sˆınt ̆am ̆arian,A.,Furdui,O., Sharpening Mathematical Analysis Skills, Springer, 2021.

https://doi.org/10.1007/978-3-030-77139-3

Stojiljkovi ́c ,V., Some series associated with central binomial coefficients and harmonic numbers, Octogon Mathematical Magazine , 29(2), 749-763 (2021).

Stojiljkovi ́c, V.,Fabiano,N., ˇSe ˇsum ˇCavi ́c ,V., Harmonic series with polylogarithmic functions, Vojnotehniˇcki glasnik/Military Technical Courier, 70(1), 43-61 (2022).

https://doi.org/10.5937/vojtehg70-35148