Uniquely colorable hypergraphs

Abstract

An r-uniform hypergraph is uniquely k-colorable if there exists exactly one partition of its vertex set into k parts such that every edge contains at most one vertex from each part. For integers k r 2, let k,r denote the minimum real number such that every n-vertex k-partite r-uniform hypergraph with positive codegree greater than k,r · n and no isolated vertices is uniquely k-colorable. A classic result by of Bollob\'asBol78 established that k,2 = 3k-53k-2 for every k 2. We consider the uniquely colorable problem for hypergraphs. Our main result determines the precise value of k,r for all k r 3. In particular, we show that k,r exhibits a phase transition at approximately k = 4r-23, a phenomenon not seen in the graph case. As an application of the main result, combined with a classic theorem by Frankl--F\"uredi--Kalai, we derive general bounds for the analogous problem on minimum positive i-degrees for all 1≤ i<r, which are tight for infinitely many cases.