On the number of families avoiding a subposet
Abstract
In this paper we show that for any poset P that is not an antichain, the number of induced P-free families in the Boolean lattice 2[n] is at most 2O(La*(n,P)), where La*(n,P) denotes the the largest size of an induced P-free subfamily of 2[n]. We also obtain related supersaturation results.
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