English

On $k$-layered numbers

Number Theory 2022-07-20 v1

Abstract

A positive integer nn is said to be kk-layered if its divisors can be partitioned into kk sets with equal sum. In this paper, we start the systematic study of these class of numbers. In particular, we state some algorithms to find some even kk-layered numbers nn such that 2αn2^{\alpha}n is a kk-layered number for every positive integer α\alpha. We also find the smallest kk-layered number for 1k81\leq k\leq 8. Furthermore, we study when n!n! is a 33-layered and when is a 44-layered number. Moreover, we classify all 44-layered numbers of the form n=pαqβrtn=p^{\alpha}q^{\beta}rt, where α\alpha, 1β31\leq \beta\leq 3, pp, qq, rr, and tt are two positive integers and four primes, respectively. In addition, in this paper, some other results concerning these numbers and their relationship with kk-multiperfect numbers, near-perfect numbers, and superabundant numbers are discussed. Also, we find an upper bound for the differences of two consecutive kk-layered numbers for every positive integer 1k51\leq k\leq 5. Finally, by assuming the smallest kk-layered number, we find an upper bound for the difference of two consecutive kk-layered numbers.

Keywords

Cite

@article{arxiv.2207.09053,
  title  = {On $k$-layered numbers},
  author = {Farid Jokar},
  journal= {arXiv preprint arXiv:2207.09053},
  year   = {2022}
}

Comments

25 pages, 2 tables, comments are welcome

R2 v1 2026-06-25T01:02:24.227Z