Pinned Repositories
Archive
Archived materials related to Homotopy Type Theory.
book
A textbook on informal homotopy type theory
coq
Coq is a formal proof management system. It provides a formal language to write mathematical definitions, executable algorithms and theorems together with an environment for semi-interactive development of machine-checked proofs.
Coq-HoTT
A Coq library for Homotopy Type Theory
EPIT-2020
EPIT 2020 - Spring School on Homotopy Type Theory
Foundations
Development of the univalent foundations of mathematics in Coq
HoTT-2019
Conference on Homotopy Type Theory 2019
HoTT-2023
Conference on Homotopy Type Theory 2023
HoTT-Agda
Development of homotopy type theory in Agda
M-types
A formalization of M-types in Agda
Homotopy Type Theory's Repositories
HoTT/book
A textbook on informal homotopy type theory
HoTT/Coq-HoTT
A Coq library for Homotopy Type Theory
HoTT/HoTT-Agda
Development of homotopy type theory in Agda
HoTT/EPIT-2020
EPIT 2020 - Spring School on Homotopy Type Theory
HoTT/M-types
A formalization of M-types in Agda
HoTT/coq
Coq is a formal proof management system. It provides a formal language to write mathematical definitions, executable algorithms and theorems together with an environment for semi-interactive development of machine-checked proofs.
HoTT/Foundations
Development of the univalent foundations of mathematics in Coq
HoTT/HoTT-2019
Conference on Homotopy Type Theory 2019
HoTT/HoTT-2023
Conference on Homotopy Type Theory 2023
HoTT/Archive
Archived materials related to Homotopy Type Theory.