JOURNAL OF SHANDONG UNIVERSITY(NATURAL SCIENCE) ›› 2015, Vol. 50 ›› Issue (04): 63-66.doi: 10.6040/j.issn.1671-9352.0.2014.327

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Adjacent vertex-distinguishing edge/total colorings of double graph of some graphs

HE Xue, TIAN Shuang-liang   

  1. School of Mathematics and Computer Science, Northwest University for Nationalities, Lanzhou 730030, Gansu, China
  • Received:2014-07-15 Revised:2015-03-05 Online:2015-04-20 Published:2015-04-17

Abstract: Let G be a simple graph with vertex set V(G) and edge set E(G). An edge-coloring σ of G is called an adjacent vertex distinguishing edge-coloring of G if Cσ(u)≠Cσ(v) for any uv∈E(G), where Cσ(u) denotes the set of colors of edges incident with u. A total-coloring σ of G is called an adjacent vertex distinguishing total-coloring of G if Sσ(u)≠Sσ(v) for any uvE(G), where Sσ(u) denotes the set of colors of edges incident with u together with the color assigned to u. The minimum number of colors required for an adjacent vertex-distinguishing edge-coloring (resp. total-coloring) of G is called adjacent vertex-distinguishing edge (resp. total) chromatic number, and denoted by χ'as(G) (resp. χat(G)). The upper bounds for these parameters of the double graph D(G) of graph G are given in this paper. Specifically, the exact value of these parameters for the double graph of complete graphs and trees are determined.

Key words: double graph, adjacent vertex-distinguishing edge coloring, adjacent vertex-distinguishing total coloring

CLC Number: 

  • O157.5
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