Relating Idioms, Arrows and Monads from Monoidal Adjunctions

July 11, 2018 Β· Declared Dead Β· πŸ› MSFP@FSCD

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Authors Exequiel Rivas arXiv ID 1807.04084 Category cs.PL: Programming Languages Cross-listed cs.LO Citations 1 Venue MSFP@FSCD Last Checked 4 months ago
Abstract
We revisit once again the connection between three notions of computation: monads, arrows and idioms (also called applicative functors). We employ monoidal categories of finitary functors and profunctors on finite sets as models of these notions of computation, and develop the connections between them through adjunctions. As a result, we obtain a categorical version of Lindley, Yallop and Wadler's characterisation of monads and idioms as arrows satisfying an isomorphism.
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