The sharp threshold for maximum-size sum-free subsets in even-order abelian groups
Abstract
We study sum-free sets in sparse random subsets of even order abelian groups. In particular, we determine the sharp threshold for the following property: the largest such set is contained in some maximum-size sum-free subset of the group. This theorem extends recent work of Balogh, Morris and Samotij, who resolved the case G = Z2n, and who obtained a weaker threshold (up to a constant factor) in general.
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