Zbl.No: 970.56262
Autor: Deuber, W.A.; Erdös, Paul; Gunderson, D.S.; Kostochka, A.V.; Meyer, A.G.
Title: Intersection statements for systems of sets. (In English)
Source: J. Comb. Theory, Ser. A 79, No.1, 118-132, Art. No.TA962778 (1997).
Review: A collection of sets is called a \Delta-system if any two sets have the same intersection. Let f(k,r) be the least integer such that any collelction of f(k,r) k-element sets contains a \Delta-system consisting of r sets. P. Erdös and R. Rado [J. Lond. Math. Soc. 44, 467-479 (1969; Zbl 172.29601)] proved that (r-1)k < f(k,r) < k!(r-1)k and conjectured that f(k,r) < Ck for some constant C. Erdös offered $1000 for a proof or disproof of this for r = 3.
The paper under review concerns a related problem. Let F(n,r) be the greatest integer such that there exists a collection of subsets of an n-element set which does not contain a \Delta-system consiting of r sets. P. Erdös and E. Szemerédi [J. Comb. Theory, Ser. A 24, 308-313 (1978; Zbl 383.05002)] showed that F(n,3) < 2n-\sqrt n/10 and F(n,r) > (1+cr)n, where the constant cr ––> 1 as r ––> oo. The authors provide new lower bounds for F(n,r) which are constructive and improve the previous best probabilistic results. They also prove a new upper bound. Moreover, for certain n it is shown that F(n,3) \geq 1.551n-2.
Reviewer: A.Vince (Gainesville)
Classif.: * 05D05 Extremal set theory
Keywords: \Delta-system
Citations: Zbl 172.29601; Zbl 383.05002
