Concerning FAT Colorings of Graphs

Abstract

Let G be a graph and let C be a color set of cardinality k. Suppose c V(G) C is a (not necessarily proper) vertex coloring whose all color classes are V1, V2, …, Vk, each of which is nonempty. The vertex coloring c is said to be a FAT k-coloring of G if there exist real numbers α and β, both in [0,1], such that for every vertex v∈ V(G) and every color class Vi the following equalities hold: | Vi N(v) | = cases α (v) & if \ \ v Vi β (v) & if \ \ v ∈ Vi . cases Let k > 1 be a fixed integer, and let α ∈ [ 0 , 1k-1 ) Q and β ∈ [ 0 , 1 ] Q be some fixed rational numbers satisfying β + (k-1) α = 1 . It was asked for the existence of a graph G with δ (G) > 0 admitting some FAT k-coloring with the corresponding parameters α and β. This paper settles the question in the affirmative. We explicitly construct a sequence \Gn\n=1∞ of pairwise non-homomorphically equivalent graphs, each being a regular graph of positive degree, admitting a FAT k-coloring with the corresponding parameters α and β.

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