On a theorem of Shkredov
classification
🧮 math.CA
keywords
subsetabelianadditiveenergyfinitegroupleastshkredov
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We show that if A is a finite subset of an abelian group with additive energy at least c|A|^3 then there is a subset L of A with |L|=O(c^{-1}\log |A|) such that |A \cap Span(L)| >> c^{1/3}|A|.
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