Covering and tiling hypergraphs with tight cycles

Abstract

Given 3 ≤ k ≤ s, we say that a k-uniform hypergraph Cks is a tight cycle on s vertices if there is a cyclic ordering of the vertices of Cks such that every k consecutive vertices under this ordering form an edge. We prove that if k 3 and s 2k2, then every k-uniform hypergraph on n vertices with minimum codegree at least (1/2 + o(1))n has the property that every vertex is covered by a copy of Cks. Our result is asymptotically best possible for infinitely many pairs of s and k, e.g. when s and k are coprime. A perfect Cks-tiling is a spanning collection of vertex-disjoint copies of Cks. When s is divisible by k, the problem of determining the minimum codegree that guarantees a perfect Cks-tiling was solved by a result of Mycroft. We prove that if k 3 and s 5k2 is not divisible by k and s divides n, then every k-uniform hypergraph on n vertices with minimum codegree at least (1/2 + 1/(2s) + o(1))n has a perfect Cks-tiling. Again our result is asymptotically best possible for infinitely many pairs of s and k, e.g. when s and k are coprime with k even.