Quotient Completion for the Foundation of Constructive Mathematics

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Logica Universalis 7 (3):371-402 (2013)
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Abstract

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

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10.1007/s11787-013-0080-2

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Citations of this work

A characterization of generalized existential completions.Maria Emilia Maietti & Davide Trotta - 2023 - Annals of Pure and Applied Logic 174 (4):103234.
On a Generalization of Equilogical Spaces.Fabio Pasquali - 2018 - Logica Universalis 12 (1-2):129-140.
Triposes, q-toposes and toposes.Jonas Frey - 2015 - Annals of Pure and Applied Logic 166 (2):232-259.

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References found in this work

Introduction to Higher Order Categorical Logic.J. Lambek & P. J. Scott - 1989 - Journal of Symbolic Logic 54 (3):1113-1114.
Adjointness in Foundations.F. William Lawvere - 1969 - Dialectica 23 (3‐4):281-296.
Foundations of Constructive Analysis.Errett Bishop - 1967 - New York, NY, USA: Mcgraw-Hill.
A minimalist two-level foundation for constructive mathematics.Maria Emilia Maietti - 2009 - Annals of Pure and Applied Logic 160 (3):319-354.
Book Reviews. [REVIEW]B. Jacobs - 2001 - Studia Logica 69 (3):429-455.

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