Abstract Let G □ H denote the Cartesian product of graphs G and H . In this paper, we study the { k } -domination number of Cartesian product of graphs and give a new lower bound of γ { k } ( G □ H ) in terms of packing and { k } -domination numbers of G and H . As applications of this lower bound, we prove that: (i) For k = 1 , the new lower bound improves the bound given by Chen, et al. [G. Chen, W. Piotrowski, W. Shreve, A partition approach to Vizing’s conjecture, J. Graph Theory 21 (1996) 103–111]. (ii) The product of the { k } -domination numbers of two any graphs G and H , at least one of which is a ( ρ , γ ) -graph, is no more than k γ { k } ( G □ H ) . (iii) The product of the { 2 } -domination numbers of any graphs G and H , at least one of which is a ( ρ , γ − 1 ) -graph, is no more than 2 γ { 2 } ( G □ H ) .
[1]
Guantao Chen,et al.
A partition approach to Vizing's conjecture
,
1996
.
[2]
Douglas F. Rall,et al.
Vizing's conjecture and the one-half argument
,
1995,
Discuss. Math. Graph Theory.
[3]
W. Edwin Clark,et al.
Inequality Related to Vizing's Conjecture
,
2000,
Electron. J. Comb..
[4]
Michael S. Jacobson,et al.
On graphs having domination number half their order
,
1985
.
[5]
V. G. Vizing.
SOME UNSOLVED PROBLEMS IN GRAPH THEORY
,
1968
.
[6]
Michael A. Henning,et al.
ON INTEGER DOMINATION IN GRAPHS AND VIZING-LIKE PROBLEMS
,
2006
.
[7]
S. Hedetniemi,et al.
Domination in graphs : advanced topics
,
1998
.