Christian Sattler: Do cubical models of type theory also model homotopy types

Evan Cavallo, Why some cubical models don't present spacesSee more

EPIT Spring School on HoTT: Christian Sattler Part 1 (models of type theories, CwF)See more

EPIT Spring School on HoTT: Christian Sattler Part 2 (the simplicial model)See more

Anders Mörtberg, Unifying cubical models of homotopy type theorySee more

Brandon Doherty, Cubical models of (∞,1)-categoriesSee more

Higher Inductive Types in Cubical Computational Type TheorySee more

Evan Cavallo, Cubes with one connection and relative eleganceSee more

Cubical Agda: A Dependently Typed Programming Language with Univalence and Higher Inductive TypesSee more

Andrew Pitts, Axiomatizing cubical sets models of univalent foundationsSee more

Natural Models of Type Theory - Steve AwodeySee more

Introduction to Cubical Type Theory (Part I)See more

Homotopy Type Theory - An Introduction to Topology, Formal Logic, and HoTT #SoME3See more

The Equivariant Uniform Kan Fibration Model of Cubical Homotopy Type TheorySee more

Simon Huber, Homotopy canonicity for cubical type theorySee more

Matthew Weaver, A constructive model of directed univalence in bicubical setsSee more