On List Coloring with Separation of the Complete Graph and Set System Intersections

Abstract

We consider the following list coloring with separation problem: Given a graph G and integers a,b, find the largest integer c such that for any list assignment L of G with |L(v)|= a for any vertex v and |L(u) L(v)| c for any edge uv of G, there exists an assignment of sets of integers to the vertices of G such that (u)⊂ L(u) and |(v)|=b for any vertex u and (u) (v)= for any edge uv. Such a value of c is called the separation number of (G,a,b). Using a special partition of a set of lists for which we obtain an improved version of Poincar\'e's crible, we determine the separation number of the complete graph Kn for some values of a,b and n, and prove bounds for the remaining values.