Harmonic LCM patterns and sunflower-free capacity

Abstract

Fix an integer k 3. Call a set A⊂eq [N] LCM-k-free if it does not contain distinct a1,…,ak such that lcm(ai,aj) is the same for all 1 i<j k. Define fk(N):=\Σa∈ A1a: A⊂eq [N] is LCM-k-free\. Addressing a problem of Erdos, we prove an explicit unconditional lower bound fk(N) ( N)ck-o(1), ck:=k-2e((k-2)!)1/(k-2). Let Fk(n) denote the maximum size of a k-sunflower-free family of subsets of [n], and define the Erdos--Szemer\'edi k-sunflower-free capacity by μk S:=n∞Fk(n)1/n. Motivated by a remark of Erdos relating this problem to the sunflower conjecture, we show that ( N)μk S-o(1) fk(N) ( N)μk S-1+o(1). Furthermore, we show that the Erdos--Szemer\'edi sunflower conjecture fails for this fixed k (i.e. μk S=2) if and only if fk(N)=( N)1-o(1).

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