On a Relation between Schreier-type Sets and a Modification of Tur\'an Graphs
Abstract
Recently, a relation between Schreier-type sets and Tur\'an graphs was discovered. In this note, we give a combinatorial proof and obtain a generalization of the relation. Specifically, for p, q 1, let Aq := \F⊂N: |F| = 1 or F is an arithmetic progression with difference q\ and Sr(n, p, q)\ :=\ \#\F⊂ \1, …, n\\,:\, p F |F| and F∈ Aq\. We show that Sr(n, p, q) \ =\ T(n+1, pq+1, q), where T(·, ·, ·) is the number of edges of an n-vertex graph that is a modification of Tur\'an graphs. We also prove that Sr(n,p,q) is the partial sum of certain sequences.
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