The Multiple-orientability Thresholds for Random Hypergraphs

Abstract

A k-uniform hypergraph H = (V, E) is called -orientable, if there is an assignment of each edge e∈ E to one of its vertices v∈ e such that no vertex is assigned more than edges. Let Hn,m,k be a hypergraph, drawn uniformly at random from the set of all k-uniform hypergraphs with n vertices and m edges. In this paper we establish the threshold for the -orientability of Hn,m,k for all k 3 and 2, i.e., we determine a critical quantity ck, * such that with probability 1-o(1) the graph Hn,cn,k has an -orientation if c < ck, *, but fails doing so if c > ck, *. Our result has various applications including sharp load thresholds for cuckoo hashing, load balancing with guaranteed maximum load, and massive parallel access to hard disk arrays.