A Note on Deaconescu's Conjecture
General Mathematics
2025-07-08 v1
Abstract
Hasanalizade [1] studied Deaconescu's conjecture for positive composite integer . A positive composite integer is said to be a Deaconescu number if . In this paper, we improve Hasanalizade's result by proving that a Deaconescu number must have at least seventeen distinct prime divisors, i.e., and must be strictly larger than . Further, we prove that if any Deaconescu number has all prime divisors greater than or equal to , then , where is the smallest prime divisor of and if then all the prime divisors of must be congruent to modulo and .
Cite
@article{arxiv.2507.02930,
title = {A Note on Deaconescu's Conjecture},
author = {Sagar Mandal},
journal= {arXiv preprint arXiv:2507.02930},
year = {2025}
}
Comments
5 pages