Regular behaviour of the maximal hypergraph chromatic number

Abstract

Let m(n,r) denote the minimal number of edges in an n-uniform hypergraph which is not r-colorable. It is known that for a fixed n one has \[ cn rn < m(n,r) < Cn rn. \] We prove that for any fixed n the sequence ar := m(n,r)/rn has a limit, which was conjectured by Alon. We also prove the list colorings analogue of this statement.