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On the Cartesian product of an arbitrarily partitionable graph and a traceabl...
International audience -
Partitioning the Cartesian product of an arbitrarily partitionable graph and ...
A graph G is arbitrarily partitionable (AP for short) if for every sequence (n_1, ..., n_p) of positive integers summing up to |V(G)| there exists a partition (V_1,... -
On domination of Cartesian product of directed cycles
Let $\gamma(C_m\Box C_n)$ be the domination number of the Cartesian product of directed cycles $C_m$ and $C_n$ for $m,n\geq2$. Shaheen [] and Liu and al.[ ], [ ]... -
Polytopality and Cartesian products of graphs
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Queue Layouts of Graph Products and Powers
International audience
