On local antimagic chromatic numbers of the join of two special families of graphs
Abstract
It is known that null graphs and 1-regular graphs are the only regular graphs without local antimagic chromatic number. In this paper, we use matrices of size (2m+1) × (2k+1) to completely determine the local antimagic chromatic number of the join of null graphs, Om, m 1, and 1-regular graphs of odd components, (2k+1)P2, k 1. Consequently, we obtained infinitely many (possibly disconnected or regular) tripartite graphs with local antimagic chromatic number 3.
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