English

Small Gaps Between Three Almost Primes and Almost Prime Powers

Number Theory 2021-03-16 v1

Abstract

A positive integer is called an EjE_j-number if it is the product of jj distinct primes. We prove that there are infinitely many triples of E2E_2-numbers within a gap size of 3232 and infinitely many triples of E3E_3-numbers within a gap size of 1515. Assuming the Elliot-Halberstam conjecture for primes and E2E_2-numbers, we can improve these gaps to 1212 and 55, respectively. We can obtain even smaller gaps for almost primes, almost prime powers, or integers having the same exponent pattern in the their prime factorizations. In particular, if d(x)d(x) denotes the number of divisors of xx, we prove that there are integers a,ba,b with 1a<b91\leq a < b \leq 9 such that d(x)=d(x+a)=d(x+b)=192d(x)=d(x+a)=d(x+b) = 192 for infinitely many xx. Assuming Elliot-Halberstam, we prove that there are integers a,ba,b with 1a<b41\leq a < b \leq 4 such that d(x)=d(x+a)=d(x+b)=24d(x)=d(x+a)=d(x+b) = 24 for infinitely many xx.

Keywords

Cite

@article{arxiv.2103.07500,
  title  = {Small Gaps Between Three Almost Primes and Almost Prime Powers},
  author = {Daniel A. Goldston and Apoorva Panidapu and Jordan Schettler},
  journal= {arXiv preprint arXiv:2103.07500},
  year   = {2021}
}

Comments

15 pages, 3 figures

R2 v1 2026-06-24T00:05:07.834Z