On r-hued list coloring of K4(7)-minor free graphs

被引:2
作者
Wei, Wenjuan [1 ]
Liu, Fengxia [1 ]
Xiong, Wei [1 ]
Lai, Hong-Jian [2 ]
机构
[1] Xinjiang Univ, Coll Math & Syst Sci, Urumqi 830046, Xinjiang, Peoples R China
[2] West Virginia Univ, Dept Math, Morgantown, WV 26506 USA
来源
DISCRETE APPLIED MATHEMATICS | 2022年 / 309卷
关键词
(L; r)-coloring; r-hued list chromatic number; Graph minor; EVERY PLANAR MAP; UPPER-BOUNDS; SQUARE;
D O I
10.1016/j.dam.2021.12.013
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
For a given list assignment L of a graph G, an (L, r)-coloring of G is a proper coloring c such that for any vertex v with degree d(v), v is adjacent to vertices of at least min{d(v), r} different color with c(v) is an element of L(v). The r-hued list chromatic number of G, denoted as chi(L,r)(G), is the least integer k, such that for any v is an element of V (G) and every list assignment L with |L(v)| = k, G has an (L, r)-coloring. Let K(r) = r + 3 if 2 <= r <= 3, K(r) = (sic)3r/2(sic) + 1 if r >= 4. In Song et al. (2014), it is proved that if G is a K4-minor-free graph, then chi L,r(G) <= K(r) + 1. Let K4(n) be the set of all subdivisions of K4 on n vertices. Utilizing the decompositions by Chen et al for K4(7)-minor free graphs in Chen et al. (2020), we prove that if G is a K4(7)-minor free graph, then chi L,r(G) <= K(r) + 1. (c) 2021 Elsevier B.V. All rights reserved.
引用
收藏
页码:301 / 309
页数:9
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