Abstract

In this work we deal with three variants of domination in graphs, these are Italian domination (or Roman {2}-domination), {2}-domination and 2-domination. We define Sicilian graphs as those graphs for which the Italian domination and the {2}-domination numbers coincide. Sicilian graphs constitute a superclass of Italian graphs (introduced by Klostermeyer et al. in 2019). First, we give a characterization of Italian graphs in terms of the existence of a special Roman {2}-dominating function. Then, we focus on web graphs for which their {2}-domination number was recently found (Cheng et al., 2020), and we study Sicilian web graphs. We explore also Sicilian co-bipartite graphs. As a by-product, we find the 2-domination number for web graphs and co-bipartite graphs. Finally, we show necessary conditions for non-Italian graphs to be Sicilian as well as characterize Sicilian graphs within some relevant graph classes such as quasi-threshold graphs and cographs.

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