English

A fast algorithm to compute the Ramanujan-Deninger gamma-function and some number-theoretic applications

Number Theory 2021-09-01 v2

Abstract

We introduce a fast algorithm to compute the Ramanujan-Deninger gamma function and its logarithmic derivative at positive values. Such an algorithm allows us to greatly extend the numerical investigations about the Euler-Kronecker constants Gq\mathfrak{G}_q, Gq+\mathfrak{G}_q^+ and Mq=maxχχ0L/L(1,χ)M_q=\max_{\chi\ne \chi_0} \vert L^\prime/L(1,\chi)\vert, where qq is an odd prime, χ\chi runs over the primitive Dirichlet characters mod q\bmod\ q, χ0\chi_0 is the trivial Dirichlet character mod q\bmod\ q and L(s,χ)L(s,\chi) is the Dirichlet LL-function associated to χ\chi. Using such algorithms we obtained that G50040955631=0.16595399\mathfrak{G}_{50 040 955 631} =-0.16595399\dotsc and G50040955631+=13.89764738\mathfrak{G}_{50 040 955 631}^+ =13.89764738\dotsc thus getting a new negative value for Gq\mathfrak{G}_q. Moreover we also computed Gq\mathfrak{G}_q, Gq+\mathfrak{G}_q^+ and MqM_q for every odd prime qq, 106<q10710^6< q\le 10^7, thus extending previous results. As a consequence we obtain that both Gq\mathfrak{G}_q and Gq+\mathfrak{G}_q^+ are positive for every odd prime qq up to 10710^7 and that 1720loglogq<Mq<54loglogq\frac{17}{20} \log \log q< M_q < \frac{5}{4} \log \log q for every odd prime 1531<q1071531 < q\le 10^7. In fact the lower bound holds true for q>13q>13. The programs used and the results here described are collected at the following address \url{http://www.math.unipd.it/~languasc/Scomp-appl.html}.

Keywords

Cite

@article{arxiv.2005.10046,
  title  = {A fast algorithm to compute the Ramanujan-Deninger gamma-function and some number-theoretic applications},
  author = {Alessandro Languasco and Luca Righi},
  journal= {arXiv preprint arXiv:2005.10046},
  year   = {2021}
}

Comments

to appear in Math. Comp. Inserted section 5.7 and two histograms. Several typos corrected

R2 v1 2026-06-23T15:41:13.045Z