The VC-dimension of quadratic residues in finite fields
Abstract
We study the Vapnik-Chervonenkis (VC) dimension of the set of quadratic residues (i.e. squares) in finite fields, Fq, when considered as a subset of the additive group. We conjecture that as q ∞, the squares have the maximum possible VC-dimension, viz. (1+o(1))2 q. We prove, using the Weil bound for multiplicative character sums, that the VC-dimension is ≥ (12 + o(1))2 q. We also provide numerical evidence for our conjectures. The results generalize to multiplicative subgroups ⊂eq Fq× of bounded index.
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