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Multivalued generalizations of the Frankl--Pach Theorem

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arxiv 1008.4660 v2 pith:YQ7C5AVX submitted 2010-08-27 math.CO math.AC

Multivalued generalizations of the Frankl--Pach Theorem

classification math.CO math.AC
keywords choosegeneralizationstheoremuniformabovearbitrarybasisdescribe
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P. Frankl and J. Pach proved the following uniform version of Sauer's Lemma. Let $n,d,s$ be natural numbers such that $d\leq n$, $s+1\leq n/2$. Let $\cF \subseteq {[n] \choose d}$ be an arbitrary $d$-uniform set system such that $\cF$ does not shatter an $s+1$-element set, then $$ |\cF|\leq {n \choose s}.$$ We prove here two generalizations of the above theorem to $n$-tuple systems. To obtain these results, we use Gr\"obner basis methods, and describe the standard monomials of Hamming spheres.

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  1. An Optimal Sauer Lemma Over $k$-ary Alphabets

    cs.LG 2026-04 unverdicted novelty 8.0

    A sharp Sauer inequality for multiclass and list prediction is established in terms of the DS dimension, tight for every alphabet size k, list size ℓ, and dimension value.