论文信息 - Note on Independent Sets in Steiner Systems

Note on Independent Sets in Steiner Systems

A partial Steiner (n, k, l)-system or briefly (n, k, l)-system is a pair (V, S), where V is an n-set and S is a collection of k-subsets of V, such that every l-subset of V is contained in at most one k-subset of S. A subset X ⊂ V is called independent if [X]k ∩ S = 0. The size of the largest independent set in S is denoted by α(S). Define The purpose of this note is to prove that for every k, l, k > l holds, where c, d are positive constants depending on k and l only.

Vojtech Rödl | Edita Sinajová | V. Rödl | E. Sinajová | Edita Sinajová

[1] P. Erdos,et al. On chromatic number of graphs and set-systems , 1966 .

[2] Richard M. Wilson,et al. An Existence Theory for Pairwise Balanced Designs II. The Structure of PBD-Closed Sets and the Existence Conjectures , 1972, J. Comb. Theory A.

[3] Joel H. Spencer,et al. Asymptotic lower bounds for Ramsey functions , 1977, Discret. Math..

[4] János Komlós,et al. Extremal Uncrowded Hypergraphs , 1982, J. Comb. Theory, Ser. A.

[5] Zoltán Füredi. Maximal Independent Subsets in Steiner Systems and in Planar Sets , 1991, SIAM J. Discret. Math..

[6] P. Erdos-L Lovász. Problems and Results on 3-chromatic Hypergraphs and Some Related Questions , 2022 .