A note on cube-free problems
Abstract
Eberhard and Pohoata conjectured that every 3-cube-free subset of [N] has size less than 2N/3+o(N). In this paper we show that if we replace [N] with ZN the upper bound of 2N/3 holds, and the bound is tight when N is divisible by 3 since we have A=\a∈ ZN:a 1,23\. Inspired by this observation we conjecture that every d-cube-free subset of ZN has size less than (d-1)N/d where N is divisible by d, and we show the tightness of this bound by providing an example B=\b∈ZN:b 1,2,…,d-1d\. We prove the conjecture for several interesting cases, including when d is the smallest prime factor of N, or when N is a prime power. We also discuss some related issues regarding \x,dx\-free sets and \x,2x,…,dx\-free sets. A main ingredient we apply is to arrange all the integers into some square matrix, with m=ds× l having the coordinate (s+1,l- l/d). Here d is a given integer and l is not divisible by d.
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