On The Number of Irreducible FAT Colorings

Abstract

A vertex coloring of a graph G with nonempty color classes V1,V2,…,Vk is called a FAT k-coloring if there exist real numbers α,β∈[0,1] such that for every vertex v and every color class Vi ∈ \ V1,V2,…,Vk \ we have | N(v) Vi |= cases α°(v) & if v Vi,\\[4pt] β°(v) & if v∈ Vi . cases The FAT coloring concept was originally proposed and thoroughly studied by Beers and Mulas. The set of all FAT colorings of a graph is naturally ordered by the coarsening relation, in which finer partitions are larger in the order. The maximal elements of this poset, called irreducible FAT colorings, form a generating set: every FAT coloring of the graph can be obtained by merging color classes of some irreducible one. Beers and Mulas raised the compelling question whether, for every positive integer s, there exists a graph that admits exactly s irreducible FAT colorings. In this paper we settle this question affirmatively by exhibiting, for any given s, a graph possessing precisely s such colorings.