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Contents

Idea

A Rzk is a proof assistant implementing simplicial homotopy type theory.

Related entries

proof assistants:

based on plain type theory/set theory:

• Metamath

• Mizar, NuPRL, Isabelle, HOL

based on dependent type theory/homotopy type theory:

• Coq, Agda, Lean, Arend

based on cubical type theory:

• cubicaltt

• redtt

• yacctt

• RedPRL

• Cubical Agda

  • library and demos

  • 1lab (cross-linked reference resource)

based on modal type theory:

• Agda-flat: installation instructions

based on simplicial type theory:

• Rzk

For monoidal category theory:

• DisCoPy

For higher category theory:

• opetopic type theory

• Globular, homotopy.io

projects for formalization of mathematics with proof assistants:

• Archive of Formal Proofs (using Isabelle)

• ForMath project (using Coq)

• MathScheme

• UniMath project (using Coq and Agda)

• Xena project (using Lean)

Other proof assistants

• Andromeda

Historical projects that died out:

• The QED Project

References

Named after Charles Rezk’s definition of complete Segal spaces (cf. Rezk completion).

Landing page:

• github.com/rzk-lang

Formalization of the $(\infty,1)$-Yoneda lemma via simplicial homotopy type theory (in Rzk):

• Nikolai Kudasov, Emily Riehl, Jonathan Weinberger. Formalizing the $\infty$-categorical Yoneda lemma (2023) [[arXiv:2309.08340](https://arxiv.org/abs/2309.08340)]

Overview talk:

• Nikolai Kudasov. Rzk proof assistant and simplicial HoTT formalization, Talk at Homotopy Type Theory Electronic Seminar Talks (HoTTEST) (2023) video