Block avoiding point sequencings of partial Steiner systems

Abstract

A partial (n,k,t)λ-system is a pair (X,B) where X is an n-set of vertices and B is a collection of k-subsets of X called blocks such that each t-set of vertices is a subset of at most λ blocks. A sequencing of such a system is a labelling of its vertices with distinct elements of \0,…,n-1\. A sequencing is -block avoiding or, more briefly, -good if no block is contained in a set of vertices with consecutive labels. Here we give a short proof that, for fixed k, t and λ, any partial (n,k,t)λ-system has an -good sequencing for some =(n1/t) as n becomes large. This improves on results of Blackburn and Etzion, and of Stinson and Veitch. Our result is perhaps of most interest in the case k=t+1 where results of Kostochka, Mubayi and Verstra\"ete show that the value of cannot be increased beyond ((n n)1/t). A special case of our result shows that every partial Steiner triple system (partial (n,3,2)1-system) has an -good sequencing for each positive integer ≤ 0.0908\,n1/2.