An introductory course to Homotopy Type Theory
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Updated
Jul 24, 2020 - Agda
An introductory course to Homotopy Type Theory
A formalization of geometry in Coq based on Tarski's axiom system
GitHub repository for the seminar on Computer-assisted mathematics held at the University of Heidelberg during the Summer Semester of 2024.
The back end of a tool for checking formalization exercises.
Official repository of the Autosubst 2 project.
Formalising Type Theory in a modular way for translations between type theories
The Symbolic, Mechanized, Observable, Operational SHell: an executable formalization of the POSIX shell standard.
The front end of a tool for checking formalization exercises.
An ACL2 formalization of the Ethereum VM, aiming to be both executable and suitable for proving interesting properties of EVM contracts.
Deciding Presburger arithmetic in agda
🧊 An indexed construction of semi-simplicial and semi-cubical types
tribAin - ontology for scientific experiments in the domain of tribology
Formalization of the polymorphic lambda calculus and its parametricity theorem
LeanEuclid is a benchmark for autoformalization in the domain of Euclidean geometry, targeting the proof assistant Lean.
The Agda Universal Algebra Library (UALib) is a library of types and programs (theorems and proofs) that formalizes the foundations of universal algebra in dependent type theory using the Agda proof assistant language.
Certified implementation of a parametrized framework for concurrent garbage collectors
Material created during the Iannis Xenakis workgroup
Formalization of Wigderson's graph coloring algorithm in Coq
A formalised proof of Fermat's Last Theorem for exponent 3 in the Lean proof assistant.
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