arXiv:1106.3421 Abstract | arXiv Analytics

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Beyond sum-free sets in the natural numbers

Published 2011-06-17Version 1

For an interval [1,N] in the natural numbers, investigating subsets S of [1,N] such that |{(x,y) in S^2:x+y in S}|=0, known as sum-free sets, has attracted considerable attention. In this paper, we define r(S):=|{(x,y) in S^2: x+y in S}| and consider its behaviour as S ranges over the subsets of [1,N]. We obtain a comprehensive description of the spectrum of attainable r-values for the s-sets of [1,N], constructive existence results and structural characterizations for sets attaining extremal and near-extremal values.

Comments: 15 pages

Categories: math.CO

Subjects: 11B75

Keywords: sum-free sets, natural numbers, constructive existence results, structural characterizations, sets attaining extremal

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arXiv:1106.3421 [math.CO]Abstract References Reviews Resources

Beyond sum-free sets in the natural numbers

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Beyond sum-free sets in the natural numbers

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arXiv:1106.3421 [math.CO]Abstract References Reviews Resources