Identities of Choi-Lee-Srivastava involving the Euler-Mascheroni’s constant
We give an elementary deduction of the Choi-Lee-Srivastava’s identities involving the Euler Mascheroni’s constant, thus from them is immediate the identity of Wilf.
H. S. Wilf, Problem 10588, Amer. Math. Monthly 104 (1997) 456.
J. Choi, J. Lee, H. M. Srivastava, A generalization of Wilf’s formula, Kodai Math. J. 26 (2003) 44-48.
Chao-Ping Chen, J. Choi, Two infinite product formulas with two parameters, Integral Transforms and
Special Functions 24, No. 5 (2013) 357-363.
H. M. Srivastava, J. Choi, Zeta and q-zeta functions and associated series and integrals, Elsevier,
J. Havil, Gamma. Exploring Euler’s constant, Princeton University Press, New Jersey (2003).
P. J. Davis, Leonhard Euler’s integral: A historical profile of the gamma function, Amer. Math.
Monthly 66, No. 10 (1959) 849-869.
E. Artin, The gamma function, Holt, Rinehart and Winston, New York (1964).
G. Srinivasan, The gamma function: An eclectic tour, Amer. Math. Monthly 114, No. 4 (2007) 297-315.
J. Bonnar, The gamma function, Treasure Trove of Mathematics (2017).
J. Choi, T. Y. Seo, Evaluation of some infinite series, Indian J. Pure Appl. Math. 28 (1997) 791-796
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