VC-Dimension of Hyperplanes over Finite Fields
Abstract
Let Fqd be the d-dimensional vector space over the finite field with q elements. For a subset E⊂eq Fqd and a fixed nonzero t∈ Fq, let Ht(E)=\hy: y∈ E\, where hy is the indicator function of the set \x∈ E: x· y=t\. Two of the authors, with Maxwell Sun, showed in the case d=3 that if |E|≥ Cq114 and q is sufficiently large, then the VC-dimension of Ht(E) is 3. In this paper, we generalize the result to arbitrary dimension and improve the exponent in the case d=3.
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