On a two-sided Turán problem
The electronic journal of combinatorics, Tome 10 (2003)
Given positive integers $n,k,t$, with $2 \le k\le n$, and $t < 2^k$, let $m(n,k,t)$ be the minimum size of a family ${\cal F}$ of nonempty subsets of $[n]$ such that every $k$-set in $[n]$ contains at least $t$ sets from ${\cal F}$, and every $(k-1)$-set in $[n]$ contains at most $t-1$ sets from ${\cal F}$. Sloan et al. determined $m(n, 3, 2)$ and Füredi et al. studied $m(n, 4, t)$ for $t=2, 3$. We consider $m(n, 3, t)$ and $m(n, 4, t)$ for all the remaining values of $t$ and obtain their exact values except for $k=4$ and $t= 6, 7, 11, 12$. For example, we prove that $ m(n, 4, 5) = {n \choose 2}-17$ for $n\ge 160$. The values of $m(n, 4, t)$ for $t=7,11,12$ are determined in terms of well-known (and open) Turán problems for graphs and hypergraphs. We also obtain bounds of $m(n, 4, 6)$ that differ by absolute constants.
@article{10_37236_1735,
author = {Dhruv Mubayi and Yi Zhao},
title = {On a two-sided {Tur\'an} problem},
journal = {The electronic journal of combinatorics},
year = {2003},
volume = {10},
doi = {10.37236/1735},
zbl = {1031.05125},
url = {http://geodesic.mathdoc.fr/articles/10.37236/1735/}
}
Dhruv Mubayi; Yi Zhao. On a two-sided Turán problem. The electronic journal of combinatorics, Tome 10 (2003). doi: 10.37236/1735
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