一些涉及黎曼Zeta函数的无穷级数
Some Infinite Series Involving the Riemann Zeta Function
摘要:
用积分基本恒等式给出涉及黎曼ζ(2n)函数级数与赫尔维茨zeta函数级数。所给出级数是封闭形的。最后给出关于ζ(2n)函数与赫尔维茨zeta函数级数的数值级数。
Abstract: The series of Riemann functions and the series of hurwitz zeta functions are given by using integral basic identities. The series given is closed. Finally, the numerical series of the zeta function and hurwitz function series are given.
参考文献
|
[1]
|
Abramowitz, M. and Stegun, I.A. (Eds.) (1965) Handbook of Mathematical Functions. Dover Publications, New York, 75, 85.
|
|
[2]
|
Whittaker, E.T. and Watson, G.N. (1963) A Course of Modern Analysis: An Introduction to the General Thoery of Infinite Processes and of Analytic Functions; with an Account of the Principal Transcendental Functions. 4th Edition, Cambridge University Press, Cambridge, London, and New York.
|
|
[3]
|
Titchmarsh, E.C. (1951) The Theory of the Riemann Zeta-Function. Oxford University Press (Clarendon), London.
|
|
[4]
|
Connon, D.F. (2007) Some Series and Integrals Involving the Riemann Zetafunction. Binomial Coefficients and the Harmonic Numbers, 5.
|
|
[5]
|
Berndt, B.C. (1985) Ramanujan’s Notbooks, Part 1. Springger-Verlag, 260-263.
|
|
[6]
|
Boros, G. and Moll, V.H. (2004) Irresistible Integrals: Symbolics, Analysis and Experiments in the Evaluation of Integrals. Cambridge University Press. [Google Scholar] [CrossRef]
|
|
[7]
|
Apostol, T.M. (1976) Introduction to Analytic Number Theory. Springer-Verlag, New York, Heidelberg, and Berlin. [Google Scholar] [CrossRef]
|