Yu-Yen Chien
Published 2017-03-17Version 1
In this paper, we prove a problem proposed by Bre\v{s}ar: for any graphs $G$ and $H$, $\Gamma(G\square H)\ge\Gamma(G)\Gamma(H)+ \min\{|V(G)|-\Gamma(G),|V(H)|-\Gamma(H)\}$, where $\Gamma(G)$ denotes the upper domination number of $G$.
Italian Domination of Cartesian Products of Directed Cycles
The Localization Game On Cartesian Products
Cartesian products of two $CR$ sets
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