Arithmetic and Geometric Progressions in Productsets over Finite Fields
Abstract
Given two sets , ⊂eq q of elements of the finite field q of q elements, we show that the productset = \ab | a ∈ , b ∈\ contains an arithmetic progression of length k 3 provided that k<p, where p is the characteristic of q, and # # 3q2d-2/k. We also consider geometric progressions in a shifted productset +h, for f ∈ q, and obtain a similar result.
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