论文信息 - The method of double chains for largest families with excluded subposets

The method of double chains for largest families with excluded subposets

For a given finite poset $P$, $La(n,P)$ denotes the largest size of a family $\mathcal{F}$ of subsets of $[n]$ not containing $P$ as a weak subposet. We exactly determine $La(n,P)$ for infinitely many $P$ posets. These posets are built from seven base posets using two operations. For arbitrary posets, an upper bound is given for $La(n,P)$ depending on $|P|$ and the size of the longest chain in $P$. To prove these theorems we introduce a new method, counting the intersections of $\mathcal{F}$ with double chains, rather than chains.

Dániel T. Nagy | Peter Burcsi

[1] Gyula O. H. Katona. Forbidden Intersection Patterns in the Families of Subsets (Introducing a Method) , 2008 .

[2] Annalisa De Bonis,et al. Largest family without A ∪ B ⊆ C ∩ D , 2005 .

[3] P. Erdös. On a lemma of Littlewood and Offord , 1945 .

[4] D. Lubell. A Short Proof of Sperner’s Lemma , 1966 .

[5] Linyuan Lu,et al. On Families of Subsets With a Forbidden Subposet , 2008, Combinatorics, Probability and Computing.

[6] Boris Bukh,et al. Set Families with a Forbidden Subposet , 2008, Electron. J. Comb..

[7] E. Sperner. Ein Satz über Untermengen einer endlichen Menge , 1928 .

[8] Linyuan Lu,et al. Diamond-free families , 2010, J. Comb. Theory, Ser. A.