English

On uniquely 3-colorable plane graphs without prescribed adjacent faces

Combinatorics 2015-09-11 v1

Abstract

A graph GG is \emph{uniquely k-colorable} if the chromatic number of GG is kk and GG has only one kk-coloring up to permutation of the colors. For a plane graph GG, two faces f1f_1 and f2f_2 of GG are \emph{adjacent (i,j)(i,j)-faces} if d(f1)=id(f_1)=i, d(f2)=jd(f_2)=j and f1f_1 and f2f_2 have a common edge, where d(f)d(f) is the degree of a face ff. In this paper, we prove that every uniquely 3-colorable plane graph has adjacent (3,k)(3,k)-faces, where k5k\leq 5. The bound 5 for kk is best possible. Furthermore, we prove that there exist a class of uniquely 3-colorable plane graphs having neither adjacent (3,i)(3,i)-faces nor adjacent (3,j)(3,j)-faces, where i,j{3,4,5}i,j\in \{3,4,5\} and iji \neq j. One of our constructions implies that there exist an infinite family of edge-critical uniquely 3-colorable plane graphs with nn vertices and 73n143\frac{7}{3}n-\frac{14}{3} edges, where n(11)n(\geq 11) is odd and n2(mod3)n\equiv 2\pmod{3}.

Keywords

Cite

@article{arxiv.1509.03053,
  title  = {On uniquely 3-colorable plane graphs without prescribed adjacent faces},
  author = {Zepeng Li and Naoki Matsumoto and Enqiang Zhu and Jin Xu and Tommy Jensen},
  journal= {arXiv preprint arXiv:1509.03053},
  year   = {2015}
}

Comments

7 pages, 4 figures

R2 v1 2026-06-22T10:53:29.676Z