The Maximum Number of Subset Divisors of a Given Size

Abstract

If s is a positive integer and A is a set of positive integers, we say that B is an s-divisor of A if Σb∈ B b sΣa∈ A a. We study the maximal number of k-subsets of an n-element set that can be s-divisors. We provide a counterexample to a conjecture of Huynh that for s=1, the answer is n-1k with only finitely many exceptions, but prove that adding a necessary condition makes this true. Moreover, we show that under a similar condition, the answer is n-1k with only finitely many exceptions for each s.