Dot products in Fq3 and the Vapnik-Chervonenkis dimension
Abstract
Given a set E ⊂ Fq3, where Fq is the field with q elements. Consider a set of "classifiers" H3t(E)=\hy: y ∈ E\, where hy(x)=1 if x · y=t, x ∈ E, and 0 otherwise. We are going to prove that if |E| Cq114, with a sufficiently large constant C>0, then the Vapnik-Chervonenkis dimension of H3t(E) is equal to 3. In particular, this means that for sufficiently large subsets of Fq3, the Vapnik-Chervonenkis dimension of H3t(E) is the same as the Vapnik-Chervonenkis dimension of H3t( Fq3). In some sense the proof leads us to consider the most complicated possible configuration that can always be embedded in subsets of Fq3 of size Cq114.
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