English

Waring's Theorem for Binary Powers

Number Theory 2018-01-16 v1 Discrete Mathematics Combinatorics

Abstract

A natural number is a binary kk'th power if its binary representation consists of kk consecutive identical blocks. We prove an analogue of Waring's theorem for sums of binary kk'th powers. More precisely, we show that for each integer k2k \geq 2, there exists a positive integer W(k)W(k) such that every sufficiently large multiple of Ek:=gcd(2k1,k)E_k := \gcd(2^k - 1, k) is the sum of at most W(k)W(k) binary kk'th powers. (The hypothesis of being a multiple of EkE_k cannot be omitted, since we show that the gcd\gcd of the binary kk'th powers is EkE_k.) Also, we explain how our results can be extended to arbitrary integer bases b>2b > 2.

Keywords

Cite

@article{arxiv.1801.04483,
  title  = {Waring's Theorem for Binary Powers},
  author = {Daniel M. Kane and Carlo Sanna and Jeffrey Shallit},
  journal= {arXiv preprint arXiv:1801.04483},
  year   = {2018}
}
R2 v1 2026-06-22T23:44:30.779Z