Number of directions determined by a set in $\mathbb{F}_{q}^{2}$ and growth in $\mathrm{Aff}(\mathbb{F}_{q})$

Daniele Dona

doi:10.1007/s00454-021-00284-6

Number of directions determined by a set in Fq2 and growth in Aff(Fq)

Abstract

We prove that a set A of at most q non-collinear points in the finite plane Fq2 spans at least ≈|A|q directions: this is based on a lower bound contained in [FST13], which we prove again together with a different upper bound than the one given therein. Then, following the procedure used in [RS18], we prove a new structural theorem about slowly growing sets in Aff(Fq) for any finite field Fq, generalizing the analogous results in [Hel15] [Mur17] [RS18] over prime fields.

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