Two-level type theory and applications D Annenkov, P Capriotti, N Kraus, C Sattler arXiv preprint arXiv:1705.03307, 2017 | 73 | 2017 |

The Frobenius condition, right properness, and uniform fibrations N Gambino, C Sattler Journal of Pure and Applied Algebra 221 (12), 3027-3068, 2017 | 58 | 2017 |

Gluing for type theory A Kaposi, S Huber, C Sattler 4th International Conference on Formal Structures for Computation and …, 2019 | 35 | 2019 |

The equivalence extension property and model structures C Sattler arXiv preprint arXiv:1704.06911, 2017 | 33 | 2017 |

Homotopy canonicity for cubical type theory T Coquand, S Huber, C Sattler 4th International Conference on Formal Structures for Computation and …, 2019 | 28 | 2019 |

Higher homotopies in a hierarchy of univalent universes N Kraus, C Sattler ACM Transactions on Computational Logic (TOCL) 16 (2), 1-12, 2015 | 20 | 2015 |

Constructive sheaf models of type theory T Coquand, F Ruch, C Sattler Mathematical Structures in Computer Science 31 (9), 979-1002, 2021 | 15 | 2021 |

The constructive Kan–Quillen model structure: two new proofs N Gambino, C Sattler, K Szumiło The Quarterly Journal of Mathematics 73 (4), 1307-1373, 2022 | 12 | 2022 |

Normalization by evaluation for call-by-push-value and polarized lambda calculus A Abel, C Sattler Proceedings of the 21st International Symposium on Principles and Practice …, 2019 | 12 | 2019 |

Cubical models of -categories B Doherty, C Kapulkin, Z Lindsey, C Sattler arXiv preprint arXiv:2005.04853, 2020 | 11 | 2020 |

On the directed univalence axiom E Riehl, E Cavallo, C Sattler Talk slides, AMS Special Session on Homotopy Type Theory, Joint Mathematics …, 2018 | 11 | 2018 |

Space-valued diagrams, type-theoretically N Kraus, C Sattler arXiv preprint arXiv:1704.04543, 2017 | 11 | 2017 |

Uniform fibrations and the Frobenius condition N Gambino, C Sattler arXiv preprint arXiv:1510.00669, 2015 | 10 | 2015 |

Two-level type theory and applications D Annenkov, P Capriotti, N Kraus, C Sattler Mathematical Structures in Computer Science, 1-56, 2023 | 8 | 2023 |

Relative induction principles for type theories R Bocquet, A Kaposi, C Sattler arXiv preprint arXiv:2102.11649, 2021 | 8 | 2021 |

Do cubical models of type theory also model homotopy types C Sattler Talk at Workshop on Types, Homotopy Type theory, and Verification at …, 2018 | 7 | 2018 |

Canonicity and homotopy canonicity for cubical type theory T Coquand, S Huber, C Sattler Logical Methods in Computer Science 18, 2022 | 6 | 2022 |

For the metatheory of type theory, internal sconing is enough R Bocquet, A Kaposi, C Sattler arXiv preprint arXiv:2302.05190, 2023 | 5 | 2023 |

Constructing a universe for the setoid model. T Altenkirch, S Boulier, A Kaposi, C Sattler, F Sestini FoSSaCS, 1-21, 2021 | 5 | 2021 |

Cubical models of (∞, 1)-categories, 2020. to appear in Mem B Doherty, K Kapulkin, Z Lindsey, C Sattler Amer. Math. Soc, 0 | 5 | |