Formalizing the ∞-Categorical Yoneda Lemma-Reference-Cited by-同舟云学术

Formalizing the ∞-Categorical Yoneda Lemma

Published:2024-01-09 Issue: Volume: Page:
ISSN:
Container-title:Proceedings of the 13th ACM SIGPLAN International Conference on Certified Programs and Proofs
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Author:

Kudasov Nikolai¹,Riehl Emily²,Weinberger Jonathan²

Affiliation:

1. Innopolis University, Innopolis, Russia

2. Johns Hopkins University, Baltimore, USA

Funder

US Army Research Office

US National Science Foundation

US Air Force Office of Scientific Research

Simons Fellowship

Publisher

ACM

Link

https://dl.acm.org/doi/pdf/10.1145/3636501.3636945

Reference142 articles.

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2. Univalent categories and the Rezk completion

3. Benedikt Ahrens and Marco Maggesi . 2018 . A modular formalization of bicategories in type theory . 24th International Conference on Types for Proofs and Programs, 11–12 . Benedikt Ahrens and Marco Maggesi. 2018. A modular formalization of bicategories in type theory. 24th International Conference on Types for Proofs and Programs, 11–12.

4. Semantics for two-dimensional type theory

5. Benedikt Ahrens , Paige Randall North, and Niels Van Der Weide . 2023 . Bicategorical type theory: semantics and syntax. Mathematical Structures in Computer Science , 1–45. Benedikt Ahrens, Paige Randall North, and Niels Van Der Weide. 2023. Bicategorical type theory: semantics and syntax. Mathematical Structures in Computer Science, 1–45.