A Hypergeometric Approach, via Linear Forms Involving Logarithms, to Criteria for Irrationality of Euler’s Constant
نویسندگان
چکیده
Using an integral of a hypergeometric function, we give necessary and sufficient conditions for irrationality of Euler’s constant γ. The proof is by reduction to known irrationality criteria for γ involving a Beukers-type double integral. We show that the hypergeometric and double integrals are equal by evaluating them. To do this, we introduce a construction of linear forms in 1, γ, and logarithms from Nesterenko-type series of rational functions. In the Appendix, S. Zlobin gives a change-of-variables proof that the series and the double integral are equal.
منابع مشابه
A Hypergeometric Approach, Via Linear Forms Involving Logarithms, to Irrationality Criteria for Euler’s Constant
Using a hypergeometric function, we give necessary and sufficient conditions for irrationality of Euler’s constant, γ. The proof is by reduction to earlier criteria involving a Beukers-type double integral. We employ a method for constructing linear forms in 1, γ and logarithms from rational functions, via Nesterenko-type series.
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