English

Integer Complexity: Experimental and Analytical Results II

Number Theory 2014-09-02 v1

Abstract

We consider representing of natural numbers by expressions using 1's, addition, multiplication and parentheses. n\left\| n \right\| denotes the minimum number of 1's in the expressions representing nn. The logarithmic complexity nlog\left\| n \right\|_{\log} is defined as n/log3n\left\| n \right\|/{\log_3 n}. The values of nlog\left\| n \right\|_{\log} are located in the segment [3,4.755][3, 4.755], but almost nothing is known with certainty about the structure of this "spectrum" (are the values dense somewhere in the segment etc.). We establish a connection between this problem and another difficult problem: the seemingly "almost random" behaviour of digits in the base 3 representations of the numbers 2n2^n. We consider also representing of natural numbers by expressions that include subtraction, and the so-called PP-algorithms - a family of "deterministic" algorithms for building representations of numbers.

Keywords

Cite

@article{arxiv.1409.0446,
  title  = {Integer Complexity: Experimental and Analytical Results II},
  author = {Juris Čerņenoks and Jānis Iraids and Mārtiņš Opmanis and Rihards Opmanis and Kārlis Podnieks},
  journal= {arXiv preprint arXiv:1409.0446},
  year   = {2014}
}

Comments

21 pages, 3 figures

R2 v1 2026-06-22T05:45:37.378Z