Andrew P. Dove, Jerrold R. Griggs, Ross J. Kang, Jean-Sébastien Sereni
Published 2013-03-18Version 1
We prove a "supersaturation-type" extension of both Sperner's Theorem (1928) and its generalization by Erdos (1945) to k-chains. Our result implies that a largest family whose size is x more than the size of a largest k-chain free family and that contains the minimum number of k-chains is the family formed by taking the middle (k-1) rows of the Boolean lattice and x elements from the k-th middle row. We prove our result using the symmetric chain decomposition method of de Bruijn, van Ebbenhorst Tengbergen, and Kruyswijk (1951).
The Saturation Number of Induced Subposets of the Boolean Lattice
The cd-index of the Boolean lattice
Saturation of $k$-chains in the Boolean lattice
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