English

Numbers with Integer Complexity Close to the Lower Bound

Number Theory 2018-05-28 v1

Abstract

Define n|n| to be the complexity of nn, the smallest number of 1's needed to write nn using an arbitrary combination of addition and multiplication. John Selfridge showed that n3log3n|n|\ge 3\log_3 n for all nn. Define the defect of nn, denoted δ(n)\delta(n), to be n3log3n|n|-3\log_3 n; in this paper we present a method for classifying all nn with δ(n)<r\delta(n)<r for a given rr. From this, we derive several consequences. We prove that 2m3k=2m+3k|2^m 3^k|=2m+3k for m21m\le 21 with mm and kk not both zero, and present a method that can, with more computation, potentially prove the same for larger mm. Furthermore, defining Ar(x)A_r(x) to be the number of nn with δ(n)<r\delta(n)<r and nxn\le x, we prove that Ar(x)=Θr((logx)r+1)A_r(x)=\Theta_r((\log x)^{\lfloor r \rfloor+1}), allowing us to conclude that the values of n3log3n|n|-3\log_3 n can be arbitrarily large.

Keywords

Cite

@article{arxiv.1207.4841,
  title  = {Numbers with Integer Complexity Close to the Lower Bound},
  author = {Harry Altman and Joshua Zelinsky},
  journal= {arXiv preprint arXiv:1207.4841},
  year   = {2018}
}

Comments

23 pages; to appear in INTEGERS

R2 v1 2026-06-21T21:38:50.044Z