An Unexpected Connection Between the Discrete Zeta Function and the Erdos-Straus Conjecture Under Mballa's Conjecture

Abstract

In this article, we establish an additive decomposition of the discrete zeta function (for s ∈ N*, s > 1), more precisely of the function 4(ζ(s)-1), as a series whose general term is of the form 1/xn(s) + 1/yn(s) + 1/zn(s), where xn(s), yn(s), zn(s) are solutions of the Erdos--Straus conjecture under a personal conjecture (which I will refer to here as Mballa's Conjecture) that I formulated by parametrization in the article: arXiv:2502.20935. This connection thus builds a bridge between analysis and Egyptian fractions in general, and the Erdos--Straus conjecture in particular.