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On a Generalization of Equilogical Spaces

Logica Universalis 12 (1-2):129-140 (2018)

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Quotient Completion for the Foundation of Constructive Mathematics.Maria Emilia Maietti & Giuseppe Rosolini - 2013 - Logica Universalis 7 (3):371-402.details We apply some tools developed in categorical logic to give an abstract description of constructions used to formalize constructive mathematics in foundations based on intensional type theory. The key concept we employ is that of a Lawvere hyperdoctrine for which we describe a notion of quotient completion. That notion includes the exact completion on a category with weak finite limits as an instance as well as examples from type theory that fall apart from this. Download Export citation Bookmark 10 citations
Relating Quotient Completions via Categorical Logic.Giuseppe Rosolini & Maria Emilia Maietti - 2016 - In Peter Schuster & Dieter Probst (eds.), Concepts of Proof in Mathematics, Philosophy, and Computer Science. Boston: De Gruyter. pp. 229-250.details Download Export citation Bookmark 3 citations
A Categorical Interpretation of the Intuitionistic, Typed, First Order Logic with Hilbert’s $${\varepsilon}$$ ε -Terms.Fabio Pasquali - 2016 - Logica Universalis 10 (4):407-418.details We introduce a typed version of the intuitionistic epsilon calculus. We give a categorical semantics of it introducing a class of categories which we call \-categories. We compare our results with earlier ones of Bell :323–337, 1993). Download Export citation Bookmark 2 citations
Triposes, q-toposes and toposes.Jonas Frey - 2015 - Annals of Pure and Applied Logic 166 (2):232-259.details Download Export citation Bookmark 1 citation

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