Forbidden hypermatrices imply general bounds on induced forbidden subposet problems
Abstract
We prove that for every poset P, there is a constant C such that the size of any family of subsets of [n] that does not contain P as an induced subposet is at most Cnn2, settling a conjecture of Katona, and Lu and Milans. We obtain this bound by establishing a connection to the theory of forbidden submatrices and then applying a higher dimensional variant of the Marcus-Tardos theorem, proved by Klazar and Marcus. We also give a new proof of their result.
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