The category of simple graphs is coreflective in the comma category of groups under the free group functor
Abstract
We show that the comma category (FGrp) of groups under the free group functor F: Set Grp contains the category Gph of simple graphs as a full coreflective subcategory. More broadly, we generalize the embedding of topological spaces into Steven Vickers' category of topological systems to a simple technique for embedding certain categories into comma categories, then show as a straightforward application that simple graphs are coreflective in (FGrp).
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