Generalized Euler numbers and ordered set partitions
Abstract
The Euler numbers have been widely studied. A signed version of the Euler numbers of even subscript are given by the coefficients of the exponential generating function 1/(1+x^2/2!+x^4/4!+...). Leeming and MacLeod introduced a generalization of the Euler numbers depending on an integer parameter d where one takes the coefficients of the expansion of 1/(1+x^d/d!+x^{2d}/(2d)!+...). These numbers have been shown to have many interesting properties despite being much less studied. And the techniques used have been mainly algebraic. We propose a combinatorial model for them as signed sums over ordered partitions. We show that this approach can be used to prove a number of old and new results including a recursion, integrality, and various congruences. Our methods include sign-reversing involutions and M\"obius inversion over partially ordered sets.
Cite
@article{arxiv.2501.07692,
title = {Generalized Euler numbers and ordered set partitions},
author = {Bruce E. Sagan},
journal= {arXiv preprint arXiv:2501.07692},
year = {2025}
}
Comments
14 pages, 1 figure