English

The Generating Function for the Dirichlet Series $L_m(s)$

Number Theory 2010-04-14 v1 Combinatorics

Abstract

The Dirichlet series Lm(s)L_m(s) are of fundamental importance in number theory. Shanks defined the generalized Euler and class numbers in connection with these Dirichlet series, denoted by {sm,n}n0\{s_{m,n}\}_{n\geq 0}. We obtain a formula for the exponential generating function sm(x)s_m(x) of sm,ns_{m,n}, where m is an arbitrary positive integer. In particular, for m>1, say, m=bu2m=bu^2, where b is square-free and u>1, we prove that sm(x)s_m(x) can be expressed as a linear combination of the four functions w(b,t)sec(btx)(±cos((bp)tx)±sin(ptx))w(b,t)\sec (btx)(\pm \cos ((b-p)tx)\pm \sin (ptx)), where p is an integer satisfying 0pb0\leq p\leq b, tu2t|u^2 and w(b,t)=Kbt/uw(b,t)=K_bt/u with KbK_b being a constant depending on b. Moreover, the Dirichlet series Lm(s)L_m(s) can be easily computed from the generating function formula for sm(x)s_m(x). Finally, we show that the main ingredient in the formula for sm,ns_{m,n} has a combinatorial interpretation in terms of the m-signed permutations defined by Ehrenborg and Readdy. In principle, this answers a question posed by Shanks concerning a combinatorial interpretation for the numbers sm,ns_{m,n}.

Keywords

Cite

@article{arxiv.1004.2168,
  title  = {The Generating Function for the Dirichlet Series $L_m(s)$},
  author = {William Y. C. Chen and Neil J. Y. Fan and Jeffrey Y. T. Jia},
  journal= {arXiv preprint arXiv:1004.2168},
  year   = {2010}
}

Comments

18 pages

R2 v1 2026-06-21T15:09:48.193Z