The asymptotic uniform distribution of subset sums
Abstract
Let G be a finite abelian group of order n, and for each a∈ G and integer 1 h n let Fa(h) denote the family of all h-element subsets of G whose sum is a. A problem posed by Katona and Makar-Limanov is to determine whether the minimum and maximum sizes of the families Fa(h) (as a ranges over G) become asymptotically equal as n→ ∞ when h=n2. We affirmatively answer this question and in fact show that the same asymptotic equality holds for every 4≤ h≤ n2+1.
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