Extremal Restraints for Graph Colourings

Abstract

A restraint on a (finite undirected) graph G = (V,E) is a function r on V such that r(v) is a finite subset of N; a proper vertex colouring c of G is permitted by r if c(v) ∈ r(v) for all vertices v of G (we think of r(v) as the set of colours forbidden at v). Given a large number of colors, for restraints r with exactly one colour forbidden at each vertex the smallest number of colorings is permitted when r is a constant function, but the problem of what restraints permit the largest number of colourings is more difficult. We determine such extremal restraints for complete graphs and trees.