Affiliation:
1. Atomic Physics Laboratory, Vinča Institute of Nuclear SciencesPO Box 522, 11001 Belgrade, Serbia
Abstract
Maximon has recently given an excellent summary of the properties of the Euler dilogarithm function and the frequently used generalizations of the dilogarithm, the most important among them being the polylogarithm function Li
s
(
z
). The polylogarithm function appears in several fields of mathematics and in many physical problems. We, by making use of elementary arguments, deduce several new integral representations of the polylogarithm Li
s
(
z
) for any complex
z
for which |
z
|<1. Two are valid for all complex
s
, whenever Re
s
>1. The other two involve the Bernoulli polynomials and are valid in the important special case where the parameter
s
is a positive integer. Our earlier established results on the integral representations for the Riemann zeta function
ζ
(2
n
+1),
n
∈
N
, follow directly as corollaries of these representations.
Subject
General Physics and Astronomy,General Engineering,General Mathematics
Reference8 articles.
1. Abramowitz M& Stegun I.A Handbook of mathematical functions with formulas graphs and mathematical tables. 1972 New York NY:Dover.
2. Berndt B.C Ramanujan's notebooks part I. 1985 New York NY:Springer.
3. Integral representations of the Riemann zeta function for odd-integer arguments
4. Erdélyi A Magnus W Oberhettinger F& Tricomi F.G vol. I 1953 New York NY:McGraw-Hill.
5. Lewin L Polylogarithms and associated functions. 1981 New York NY:North-Holland.
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