New Recurrence Relations and Matrix Equations for Arithmetic Functions Generated by Lambert Series
Abstract
We consider relations between the pairs of sequences, , generated by the Lambert series expansions, , in . In particular, we prove new forms of recurrence relations and matrix equations defining these sequences for all . 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 -Pochhammer product, , and for the first terms of the partial products, , forming the denominators of the rational partial sums of . Examples of the new results given in the article include new exact formulas for and applications to the Euler phi function, , the M\"obius function, , the sum of divisors functions, and , for , and to Liouville's lambda function, .
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