On exponential Freiman dimension
Abstract
The exponential Freiman dimension of a finite set A ⊂ Rm, introduced by Green and Tao in 2006, represents the largest positive integer d for which A contains the vertices of a non-degenerate d-dimensional parallelepiped. For every d ≥ 1, we precisely determine the largest constant Cd>0 (exponential in d) for which |A+A| ≥ Cd|A| - Od(1) holds for all sets A with exponential Freiman dimension d.
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