Abstract
Directed containers make explicit the additional structure of those containers whose set functor interpretation carries a comonad structure. The data and laws of a directed container resemble those of a monoid, while the data and laws of a directed container morphism those of a monoid morphism in the reverse direction. With some reorganization, a directed container is the same as a small category, but a directed container morphism is opcleavage-like. We draw some conclusions for comonads from this observation, considering in particular basic constructions and concepts like the opposite category and a groupoid.
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CITATION STYLE
Ahman, D., & Uustalu, T. (2016). Directed containers as categories. In Electronic Proceedings in Theoretical Computer Science, EPTCS (Vol. 207, pp. 89–98). Open Publishing Association. https://doi.org/10.4204/EPTCS.207.5
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