English

Explicit 3-colorings for exponential graphs

Data Structures and Algorithms 2019-03-15 v2

Abstract

For a graph HH and integer k1k \geq 1, two functions f,gf, g from V(H)V(H) into {1,,k}\{1, \dots, k\} are adjacent if for all edges uvuv of HH, f(u)g(v)f(u) \neq g(v). The graph of all such functions is the exponential graph KkHK_k^H. El-Zahar and Sauer proved that if χ(H)4\chi(H) \geq 4, then K3HK_3^H is 3-chromatic. Tardif showed that, implicit in their proof, is an algorithm for 3-coloring K3HK_3^H whose time complexity is polynomial in the size of K3HK_3^H. Tardif then asked if there is an "explicit" algorithm for finding such a coloring: Essentially, given a function ff belonging to a 3-chromatic component of K3HK_3^H, can we assign a color to this vertex in time polynomial in the size of HH? The main result of this paper is to present such an algorithm, answering Tardif's question affirmatively. Our algorithm yields an alternative proof of the theorem of El-Zahar and Sauer that the categorical product of two 4-chromatic graphs is 4-chromatic.

Keywords

Cite

@article{arxiv.1808.08691,
  title  = {Explicit 3-colorings for exponential graphs},
  author = {Adrien Argento and Pierre Charbit and Alantha Newman},
  journal= {arXiv preprint arXiv:1808.08691},
  year   = {2019}
}
R2 v1 2026-06-23T03:44:26.397Z