Naive cubical type theory

Mathematical Structures in Computer Science 31:1205–1231 (2021)
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Abstract

This article proposes a way of doing type theory informally, assuming a cubical style of reasoning. It can thus be viewed as a first step toward a cubical alternative to the program of informalization of type theory carried out in the homotopy type theory book for dependent type theory augmented with axioms for univalence and higher inductive types. We adopt a cartesian cubical type theory proposed by Angiuli, Brunerie, Coquand, Favonia, Harper, and Licata as the implicit foundation, confining our presentation to elementary results such as function extensionality, the derivation of weak connections and path induction, the groupoid structure of types, and the Eckmman–Hilton duality.

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Bruno Bentzen
Zhejiang University

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A cubical model of homotopy type theory.Steve Awodey - 2018 - Annals of Pure and Applied Logic 169 (12):1270-1294.
Naïve Type Theory.Thorsten Altenkirch - 2019 - In Stefania Centrone, Deborah Kant & Deniz Sarikaya (eds.), Reflections on the Foundations of Mathematics: Univalent Foundations, Set Theory and General Thoughts. Springer Verlag. pp. 101-136.

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