Linear Tur\'an numbers of acyclic quadruple systems

Abstract

A linear r-uniform hypergraph is called acycilc if it can be constructed starting from one single edge then at each step adding a new edge that intersect the union of the vertices of the previous edges in at most one vertex. Recently, Gy\'arf\'as, Ruszink\'o and S\'ark\''ozy initiated the study of the linear Tur\'an numbers of acyclic linear triple systems. In this paper, we extend their results to linear quadruple systems. Here, we concentrate on small trees, paths and matchings. For the case of small trees, we find that for a linear tree T, exlin4(n,T) relates to difficult problems on Steiner system S(2,4,n) For example, we show that exlin4(n, P4) 5n4 with equality holds if and only if the linear quadruple system is the disjoint union of S(2,4,16). Denote by E+4 the linear tree consisting of three pairwise disjoint quadruples and a fourth one intersecting all of them. We prove that 12n-49 exlin4(n, E+4) 14(n-s)9, where s is the number of vertices in G with degree at least 8. Denote by Mk and Pk the set of k pairwise disjoint quadruples and the linear path with k quadruples, respectively. For the case of paths, we show that exlin4(n, Pk) 2.5kn. For the case of matchings, we prove that for fixed k and sufficiently large n, exlin4(n, Mk)=g(n,k) where g(n,k) denotes the maximum number of quadruples that can intersect k-1 vertices in a linear quadruple system on n vertices.