论文信息 - No four subsets forming an N

No four subsets forming an N

We survey results concerning the maximum size of a family F of subsets of an n-element set such that a certain configuration is avoided. When F avoids a chain of size two, this is just Sperner's theorem. Here we give bounds on how large F can be such that no four distinct sets A,B,C,D@?F satisfy A@?B, C@?B, C@?D. In this case, the maximum size satisfies (n@?n2@?)(1+1n+@W(1n^2))=<|F|=<(n@?n2@?)(1+2n+O(1n^2)), which is very similar to the best-known bounds for the more restrictive problem of F avoiding three sets B,C,D such that C@?B, C@?D.

Gyula O. H. Katona | Jerrold R. Griggs | G. Katona

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