论文信息 - A Note on Freĭman's Theorem in Vector Spaces

A Note on Freĭman's Theorem in Vector Spaces

A famous result of Fre-man describes the sets A, of integers, for which |A+A| d K|A|. In this short note we address the analogous question for subsets of vector spaces over F2. Specifically we show that if A is a subset of a vector space over F2 with |A+A| ≤ K|A| then A is contained in a coset of size at most 2O(K3/2 log K)|A|, which improves upon the previous best, due to Green and Ruzsa, of 2O(K2)|A|. A simple example shows that the size may need to be at least 2Ω(K)|A|.

T. Sanders | T. Sanders

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