Every finite set of integers is an asymptotic approximate group
Abstract
A set A is an (r,)-approximate group in the additive abelian group G if A is a nonempty subset of G and there exists a subset X of G such that |X| ≤ and rA ⊂eq X+A. The set A is an asymptotic (r,)-approximate group if the sumset hA is an (r,)-approximate group for all sufficiently large integers h. It is proved that every finite set of integers is an asymptotic (r,r+1)-approximate group for every integer r ≥ 2.
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