Absolutely avoidable order-size pairs in hypergraphs
Abstract
For fixed integer r 2, we call a pair (m,f) of integers, m≥ 1, 0≤ f ≤ mr, absolutely avoidable if there is n0, such that for any pair of integers (n,e) with n>n0 and 0≤ e≤ nr there is an r-uniform hypergraph on n vertices and e edges that contains no induced sub-hypergraph on m vertices and f edges. Some pairs are clearly not absolutely avoidable, for example (m,0) is not absolutely avoidable since any sufficiently sparse hypergraph on at least m vertices contains independent sets on m vertices. Here we show that for any r 3 and m m0, either the pair (m, mr/2) or the pair (m, mr/2-m-1) is absolutely avoidable. Next, following the definition of Erdos, F\"uredi, Rothschild and S\'os, we define the density of a pair (m,f) as σr(m,f) = n ∞ |\e : (n,e) (m,f)\| mr. We show that for r 3 most pairs (m,f) satisfy σr(m,f)=0, and that for m > r, there exists no pair (m,f) of density 1.
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