RELEVANT CATEGORIES AND PARTIAL FUNCTIONS

Kosta Dosen and Zoran Petric

Abstract: A relevant category is a symmetric monoidal closed category with a diagonal natural transformation that satisfies some coherence conditions. Every cartesian closed category is a relevant category in this sense. The denomination \emph{relevant} comes from the connection with relevant logic. It is shown that the category of sets with partial functions, which is isomorphic to the category of pointed sets, is a category that is relevant, but not cartesian closed.

Keywords: symmetric monoidal closed categories; diagonal natural transformation; intuitionistic relevant logic; partial functions; pointed sets

Classification (MSC2000): 03B47; 03F52, 03G30, 18D10, 18D15

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