English

New Recurrence Relations and Matrix Equations for Arithmetic Functions Generated by Lambert Series

Number Theory 2017-07-06 v2

Abstract

We consider relations between the pairs of sequences, (f,gf)(f, g_f), generated by the Lambert series expansions, Lf(q)=n1f(n)qn/(1qn)L_f(q) = \sum_{n \geq 1} f(n) q^n / (1-q^n), in qq. In particular, we prove new forms of recurrence relations and matrix equations defining these sequences for all nZ+n \in \mathbb{Z}^{+}. The key ingredient to the proof of these results is given by the statement of Euler's pentagonal number theorem expanding the series for the infinite qq-Pochhammer product, (q;q)(q; q)_{\infty}, and for the first nn terms of the partial products, (q;q)n(q; q)_n, forming the denominators of the rational nthn^{th} partial sums of Lf(q)L_f(q). Examples of the new results given in the article include new exact formulas for and applications to the Euler phi function, ϕ(n)\phi(n), the M\"obius function, μ(n)\mu(n), the sum of divisors functions, σ1(n)\sigma_1(n) and σα(n)\sigma_{\alpha}(n), for α0\alpha \geq 0, and to Liouville's lambda function, λ(n)\lambda(n).

Keywords

Cite

@article{arxiv.1701.06257,
  title  = {New Recurrence Relations and Matrix Equations for Arithmetic Functions Generated by Lambert Series},
  author = {Maxie D. Schmidt},
  journal= {arXiv preprint arXiv:1701.06257},
  year   = {2017}
}

Comments

Keywords: Lambert series; matrix factorization; M\"obius function; Euler totient function; generalized sum-of-divisors function; Liouville's function. Subject Class (2010): 11A25; 05A15; 11N64; 11Y70; 05A30

R2 v1 2026-06-22T17:56:45.016Z