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Abstract We say that a graph H dominates another graph H ′ if the number of homomorphisms from H ′ to any graph G is dominated, in an appropriate sense, by the number of homomorphisms from H to G . We study the family of dominating graphs, those graphs with the property that they dominate all of their subgraphs. It has long been known that even-length paths are dominating in this sense and a result of Hatami implies that all weakly norming graphs are dominating. In a previous paper, we showed that every finite reflection group gives rise to a family of weakly norming, and hence dominating, graphs. Here we revisit this connection to show that there is a much broader class of dominating graphs.
Conlon et al. (Thu,) studied this question.
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