Composing dinatural transformations: Towards a calculus of substitution |
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| Authors: | Guy McCusker Alessio Santamaria |
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| Institution: | 1. School of Mathematics, University of Birmingham, Edgbaston, Birmingham B15 2TT, United Kingdom;2. Department of Mathematics, University of Manchester, Oxford Road M13 6PL, United Kingdom;1. Laboratoire de Mathématiques Paul Painlevé, Université de Lille, 59655 Villeneuve d''Ascq Cedex, France;2. Department of Mathematics Education, Korea National University of Education, 28173 Cheongju, South Korea;3. Institut für Algebra, Fachrichtung Mathematik, TU Dresden, 01062 Dresden, Germany;4. Department of Mathematics, Technion, Israel Institute of Technology, Haifa 32000, Israel;1. Department of Mathematics, Pedagogical University of Cracow, Podchora??ych 2, PL-30-084 Cracow, Poland;2. Jagiellonian University, Faculty of Mathematics and Computer Science, ?ojasiewicza 6, PL-30-348 Cracow, Poland;1. Department of Pure Mathematics, Faculty of Mathematics and Statistics, University of Isfahan, P.O. Box 81746-73441, Isfahan, Iran;2. School of Mathematics, Institute for Research in Fundamental Sciences (IPM), P.O. Box: 19395-5746, Tehran, Iran |
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| Abstract: | Dinatural transformations, which generalise the ubiquitous natural transformations to the case where the domain and codomain functors are of mixed variance, fail to compose in general; this has been known since they were discovered by Dubuc and Street in 1970. Many ad hoc solutions to this remarkable shortcoming have been found, but a general theory of compositionality was missing until Petri?, in 2003, introduced the concept of g-dinatural transformations, that is, dinatural transformations together with an appropriate graph: he showed how acyclicity of the composite graph of two arbitrary dinatural transformations is a sufficient and essentially necessary condition for the composite transformation to be in turn dinatural. Here we propose an alternative, semantic rather than syntactic, proof of Petri?'s theorem, which the authors independently rediscovered with no knowledge of its prior existence; we then use it to define a generalised functor category, whose objects are functors of mixed variance in many variables, and whose morphisms are transformations that happen to be dinatural only in some of their variables.We also define a notion of horizontal composition for dinatural transformations, extending the well-known version for natural transformations, and prove it is associative and unitary. Horizontal composition embodies substitution of functors into transformations and vice-versa, and is intuitively reflected from the string-diagram point of view by substitution of graphs into graphs.This work represents the first, fundamental steps towards a substitution calculus for dinatural transformations as sought originally by Kelly, with the intention then to apply it to describe coherence problems abstractly. There are still fundamental difficulties that are yet to be overcome in order to achieve such a calculus, and these will be the subject of future work; however, our contribution places us well in track on the path traced by Kelly towards a calculus of substitution for dinatural transformations. |
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| Keywords: | Dinatural transformation Compositionality Substitution Coherence Petri net |
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