Partitioning ordered hypergraphs

Abstract

An ordered r-graph is an r-uniform hypergraph whose vertex set is linearly ordered. Given 2≤ k≤ r, an ordered r-graph H is interval k- partite if there exist at least k disjoint intervals in the ordering such that every edge of H has nonempty intersection with each of the intervals and is contained in their union. Our main result implies that for each α > k - 1 and d>0, every n-vertex ordered r-graph with d \,nα edges has for some m≤ n an m-vertex interval k-partite subgraph with (d\, mα) edges. This is an extension to ordered r-graphs of the observation by Erd os and Kleitman that every r-graph contains an r-partite subgraph with a constant proportion of the edges. The restriction α > k-1 is sharp. We also present applications of the main result to several extremal problems for ordered hypergraphs.