Dániel T. Nagy, Kartal Nagy
Published 2022-01-10, updated 2022-12-01Version 2
In extremal set theory our usual goal is to find the maximal size of a family of subsets of an $n$-element set satisfying a condition. A condition is called chain-dependent, if it is satisfied for a family if and only if it is satisfied for its intersections with the $n!$ full chains. We introduce a method to handle problems with such conditions, then show how it can be used to prove three classic theorems. Then, a theorem about families containing no two sets such that $A\subset B$ and $\lambda \cdot |A| \le |B|$ is proved. Finally, we investigate problems where instead of the size of the family, the number of $\ell$-chains is maximized.
Extremal set theory, cubic forms on $\mathbb{F}_2^n$ and Hurwitz square identities
Bollobás-type inequalities on set $k$-tuples
Families of sets with no matchings of sizes 3 and 4
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