Mathematical Components
Mathematical Components is a repository of formalized mathematics developed using
the Coq proof assistant. This project finds its roots in the formal proof of
the Four Color Theorem. It has been used for large scale formalization projects,
including a formal proof of the Odd Order (Feit-Thompson) Theorem.
Here are 53 public repositories matching this topic...
Lecture notes for a short course on proving/programming in Coq via SSReflect.
-
Updated
Jun 24, 2021 - Coq
Distributed Separation Logic: a framework for compositional verification of distributed protocols and their implementations in Coq
-
Updated
Jul 26, 2024 - Coq
Monadic effects and equational reasoning in Rocq
-
Updated
Jun 5, 2025 - Coq
A Coq formalization of information theory and linear error-correcting codes
-
Updated
Jun 7, 2025 - Rocq Prover
The Coq Effective Algebra Library [maintainers=@CohenCyril,@proux01]
-
Updated
May 2, 2025 - Coq
-
Updated
Sep 17, 2024 - Coq
A course on formal verification at https://compsciclub.ru/en, Spring term 2021
-
Updated
Feb 28, 2023 - HTML
Functional Data Structures and Algorithms in SSReflect [maintainer=@clayrat]
-
Updated
Dec 30, 2024 - Coq
Finite sets, finite maps, multisets and generic sets
-
Updated
Jun 17, 2025 - Rocq Prover
-
Updated
Apr 23, 2025 - Coq
Graph Theory [maintainers=@chdoc,@damien-pous]
-
Updated
Jun 4, 2025 - Coq
Ring, field, lra, nra, and psatz tactics for Mathematical Components
-
Updated
May 14, 2025 - Coq
The formal proof of the Odd Order Theorem
-
Updated
Jun 19, 2025 - Rocq Prover
Implementation of books from Bourbaki's Elements of Mathematics in Coq [maintainer=@thery]
-
Updated
May 2, 2025 - Coq
Finite sets and maps for Coq with extensional equality
-
Updated
Jun 9, 2025 - Coq
A proof of Abel-Ruffini theorem.
-
Updated
Mar 7, 2025 - Coq
Created by Georges Gonthier
Released 2008
Latest release 2 months ago
- Followers
- 32 followers
- Repository
- math-comp/math-comp
- Website
- math-comp.github.io