Tur\'an problems for star-path forests in hypergraphs

Abstract

An r-uniform hypergraph (r-graph for short) is linear if any two edges intersect at most one vertex. Let F be a given family of r-graphs. An r-graph H is called F-free if H does not contain any member of F as a subgraph. The Tur\'an number of F is the maximum number of edges in any F-free r-graph on n vertices, and the linear Tur\'an number of F is defined as the Tur\'an number of F in linear host hypergraphs. An r-uniform linear path Pr of length is an r-graph with edges e1,…,e such that |V(ei) V(ej)|=1 if |i-j|=1, and V(ei) V(ej)= for i≠ j otherwise. Gy\'arf\'as et al. [European J. Combin. (2022) 103435] obtained an upper bound for the linear Tur\'an number of P3. In this paper, an upper bound for the linear Tur\'an number of Pr is obtained, which generalizes the known result of P3 to any Pr. Furthermore, some results for the linear Tur\'an number and Tur\'an number of several linear star-path forests are obtained.