Cartesian Double Categories with an Emphasis on Characterizing Spans
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In this thesis, we introduce Cartesian double categories, motivated by the work of Carboni, Kelly, Walters, and Wood on Cartesian bicategories. Moving from bicategories to the slightly more generalized notion of double categories allows us to set the whole theory inside the welcoming 2-category of double categories, and to overcome technical problems that were caused by working with left adjoints inside a general bicategory. Cartesian double categories that are also fibrant are of particular interest to us. After describing some important properties of Cartesian and fibrant double categories, we give a characterization of the double category of Spans as a Cartesian double category. Lastly, we talk about profunctors and give a potential framework for their characterization as Cartesian double categories.
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Cited by 2 Pith papers
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On categories of monads and comonads in double categories
Conditions on double categories are identified making the category of monads monadic over endomorphisms and cocomplete or locally presentable, with dual results for comonads.
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Transposing cartesian and other structure in double categories
Every double category with iso-strong finite products has an underlying cartesian bicategory, via transposition of natural transformations and adjunctions extending companions and conjoints.
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