English

An Algorithm and Estimates for the Erd\H{o}s-Selfridge Function (work in progress)

Number Theory 2021-06-03 v3 Data Structures and Algorithms

Abstract

Let p(n)p(n) denote the smallest prime divisor of the integer nn. Define the function g(k)g(k) to be the smallest integer >k+1>k+1 such that p((g(k)k))>kp(\binom{g(k)}{k})>k. So we have g(2)=6g(2)=6 and g(3)=g(4)=7g(3)=g(4)=7. In this paper we present the following new results on the Erd\H{o}s-Selfridge function g(k)g(k): We present a new algorithm to compute the value of g(k)g(k), and use it to both verify previous work and compute new values of g(k)g(k), with our current limit being g(323)=1 69829 77104 46041 21145 63251 22499. g(323)= 1\ 69829\ 77104\ 46041\ 21145\ 63251\ 22499. We define a new function g^(k)\hat{g}(k), and under the assumption of our Uniform Distribution Heuristic we show that logg(k)=logg^(k)+O(logk) \log g(k) = \log \hat{g}(k) + O(\log k) with high "probability". We also provide computational evidence to support our claim that g^(k)\hat{g}(k) estimates g(k)g(k) reasonably well in practice. There are several open conjectures on the behavior of g(k)g(k) which we are able to prove for g^(k)\hat{g}(k), namely that 0.525+o(1)logg^(k)k/logk1+o(1), 0.525\ldots +o(1) \quad \le \quad \frac{\log \hat{g}(k)}{k/\log k} \quad \le \quad 1+o(1), and that lim supkg^(k+1)g^(k)=. \limsup_{k\rightarrow\infty} \frac{\hat{g}(k+1)}{\hat{g}(k)}=\infty. Let G(x,k)G(x,k) count the number of integers nxn\le x such that p((nk))>kp(\binom{n}{k})>k. Unconditionally, we prove that for large xx, G(x,k)G(x,k) is asymptotic to x/g^(k)x/\hat{g}(k). And finally, we show that the running time of our new algorithm is at most g(k)exp[c(kloglogk)/(logk)2(1+o(1))]g(k) \exp[ -c (k\log\log k) /(\log k)^2 (1+o(1))] for a constant c>0c>0.

Cite

@article{arxiv.1907.08559,
  title  = {An Algorithm and Estimates for the Erd\H{o}s-Selfridge Function (work in progress)},
  author = {Brianna Sorenson and Jonathan P Sorenson and Jonathan Webster},
  journal= {arXiv preprint arXiv:1907.08559},
  year   = {2021}
}

Comments

25 pages, 5 figures; See the DOI link for the published version in ANTS; This update contains a few new minor results

R2 v1 2026-06-23T10:25:23.248Z