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ORCIDNicolai Kraus
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- affiliation: University of Nottingham, UK
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2020 – today
- 2025
[i18]Tom de Jong, Nicolai Kraus, Fredrik Nordvall Forsberg, Chuangjie Xu:
Ordinal Exponentiation in Homotopy Type Theory. CoRR abs/2501.14542 (2025)- 2024
- [j8]Danil Annenkov, Paolo Capriotti, Nicolai Kraus, Christian Sattler:
Two-level type theory and applications - ERRATUM. Math. Struct. Comput. Sci. 34(1): 80 (2024) - [j7]Nicolai Kraus
, Michael Aichem, Karsten Klein, Etienne Lein, Alex Jordan, Falk Schreiber:
TIBA: A web application for the visual analysis of temporal occurrences, interactions, and transitions of animal behavior. PLoS Comput. Biol. 20(10): 1012425 (2024) - [c18]Pierre Cagne, Ulrik Torben Buchholtz, Nicolai Kraus, Marc Bezem:
On symmetries of spheres in univalent foundations. LICS 2024: 20:1-20:14 - [i17]Pierre Cagne, Ulrik Buchholtz, Nicolai Kraus, Marc Bezem:
On symmetries of spheres in univalent foundations. CoRR abs/2401.15037 (2024) - 2023
- [j6]Danil Annenkov, Paolo Capriotti, Nicolai Kraus, Christian Sattler:
Two-level type theory and applications. Math. Struct. Comput. Sci. 33(8): 688-743 (2023) - [j5]Nicolai Kraus, Fredrik Nordvall Forsberg, Chuangjie Xu:
Type-theoretic approaches to ordinals. Theor. Comput. Sci. 957: 113843 (2023) - [c17]Tom de Jong, Nicolai Kraus, Fredrik Nordvall Forsberg, Chuangjie Xu:
Set-Theoretic and Type-Theoretic Ordinals Coincide. LICS 2023: 1-13 - [i16]Tom de Jong, Nicolai Kraus, Fredrik Nordvall Forsberg, Chuangjie Xu:
Set-Theoretic and Type-Theoretic Ordinals Coincide. CoRR abs/2301.10696 (2023) - 2022
- [j4]Nicolai Kraus, Jakob von Raumer:
A rewriting coherence theorem with applications in homotopy type theory. Math. Struct. Comput. Sci. 32(7): 982-1014 (2022) - [i15]Nicolai Kraus, Fredrik Nordvall Forsberg, Chuangjie Xu:
Type-Theoretic Approaches to Ordinals. CoRR abs/2208.03844 (2022) - 2021
- [c16]Nicolai Kraus:
Internal ∞-Categorical Models of Dependent Type Theory : Towards 2LTT Eating HoTT. LICS 2021: 1-14 - [c15]Nicolai Kraus, Fredrik Nordvall Forsberg, Chuangjie Xu:
Connecting Constructive Notions of Ordinals in Homotopy Type Theory. MFCS 2021: 70:1-70:16 - [i14]Nicolai Kraus, Fredrik Nordvall Forsberg, Chuangjie Xu:
Connecting Constructive Notions of Ordinals in Homotopy Type Theory. CoRR abs/2104.02549 (2021) - [i13]Nicolai Kraus, Jakob von Raumer:
A Rewriting Coherence Theorem with Applications in Homotopy Type Theory. CoRR abs/2107.01594 (2021) - 2020
- [c14]Nicolai Kraus, Marc Viertel, Oliver Burgert:
Control of KNX devices over IEEE 11073 service-oriented device connectivity. ICPS 2020: 421-424 - [c13]Nicolai Kraus, Jakob von Raumer:
Coherence via Well-Foundedness: Taming Set-Quotients in Homotopy Type Theory. LICS 2020: 662-675 - [i12]Nicolai Kraus, Jakob von Raumer:
Coherence via Wellfoundedness. CoRR abs/2001.07655 (2020) - [i11]Nicolai Kraus:
Internal ∞-Categorical Models of Dependent Type Theory: Towards 2LTT Eating HoTT. CoRR abs/2009.01883 (2020)
2010 – 2019
- 2019
- [c12]Nicolai Kraus, Jakob von Raumer:
Path Spaces of Higher Inductive Types in Homotopy Type Theory. LICS 2019: 1-13 - [c11]Ambrus Kaposi, András Kovács, Nicolai Kraus:
Shallow Embedding of Type Theory is Morally Correct. MPC 2019: 329-365 - [c10]Gun Pinyo, Nicolai Kraus:
From Cubes to Twisted Cubes via Graph Morphisms in Type Theory. TYPES 2019: 5:1-5:18 - [i10]Nicolai Kraus, Jakob von Raumer:
Path Spaces of Higher Inductive Types in Homotopy Type Theory. CoRR abs/1901.06022 (2019) - [i9]Gun Pinyo, Nicolai Kraus:
From Cubes to Twisted Cubes via Graph Morphisms in Type Theory. CoRR abs/1902.10820 (2019) - [i8]Ambrus Kaposi, András Kovács, Nicolai Kraus:
Shallow Embedding of Type Theory is Morally Correct. CoRR abs/1907.07562 (2019) - 2018
- [j3]Paolo Capriotti, Nicolai Kraus:
Univalent higher categories via complete Semi-Segal types. Proc. ACM Program. Lang. 2(POPL): 44:1-44:29 (2018) - [c9]Thorsten Altenkirch, Paolo Capriotti, Gabe Dijkstra, Nicolai Kraus, Fredrik Nordvall Forsberg:
Quotient Inductive-Inductive Types. FoSSaCS 2018: 293-310 - [c8]Nicolai Kraus, Thorsten Altenkirch:
Free Higher Groups in Homotopy Type Theory. LICS 2018: 599-608 - [i7]Nicolai Kraus, Thorsten Altenkirch:
Free Higher Groups in Homotopy Type Theory. CoRR abs/1805.02069 (2018) - 2017
- [j2]Nicolai Kraus, Martín Escardó, Thierry Coquand, Thorsten Altenkirch:
Notions of Anonymous Existence in Martin-Löf Type Theory. Log. Methods Comput. Sci. 13(1) (2017) - [c7]Thorsten Altenkirch, Nils Anders Danielsson, Nicolai Kraus:
Partiality, Revisited - The Partiality Monad as a Quotient Inductive-Inductive Type. FoSSaCS 2017: 534-549 - [i6]Nicolai Kraus, Christian Sattler:
Space-Valued Diagrams, Type-Theoretically (Extended Abstract). CoRR abs/1704.04543 (2017) - [i5]Danil Annenkov, Paolo Capriotti, Nicolai Kraus:
Two-Level Type Theory and Applications. CoRR abs/1705.03307 (2017) - 2016
- [c6]Thorsten Altenkirch, Paolo Capriotti, Nicolai Kraus:
Extending Homotopy Type Theory with Strict Equality. CSL 2016: 21:1-21:17 - [c5]Nicolai Kraus:
Constructions with Non-Recursive Higher Inductive Types. LICS 2016: 595-604 - [i4]Thorsten Altenkirch, Paolo Capriotti, Nicolai Kraus:
Extending Homotopy Type Theory with Strict Equality. CoRR abs/1604.03799 (2016) - [i3]Thorsten Altenkirch, Nils Anders Danielsson, Nicolai Kraus:
Partiality, Revisited: The Partiality Monad as a Quotient Inductive-Inductive Type. CoRR abs/1610.09254 (2016) - 2015
- [b1]Nicolai Kraus:
Truncation levels in homotopy type theory. University of Nottingham, UK, 2015 - [j1]Nicolai Kraus, Christian Sattler:
Higher Homotopies in a Hierarchy of Univalent Universes. ACM Trans. Comput. Log. 16(2): 18:1-18:12 (2015) - [c4]Paolo Capriotti, Nicolai Kraus, Andrea Vezzosi:
Functions out of Higher Truncations. CSL 2015: 359-373 - [i2]Paolo Capriotti, Nicolai Kraus, Andrea Vezzosi:
Functions out of Higher Truncations. CoRR abs/1507.01150 (2015) - 2014
- [c3]Nicolai Kraus:
The General Universal Property of the Propositional Truncation. TYPES 2014: 111-145 - 2013
- [c2]Nicolai Kraus, Martín Hötzel Escardó, Thierry Coquand, Thorsten Altenkirch:
Generalizations of Hedberg's Theorem. TLCA 2013: 173-188 - [i1]Nicolai Kraus, Christian Sattler:
On the Hierarchy of Univalent Universes: U(n) is not n-Truncated. CoRR abs/1311.4002 (2013) - 2011
- [c1]Andreas Abel, Nicolai Kraus:
A Lambda Term Representation Inspired by Linear Ordered Logic. LFMTP 2011: 1-13
Coauthor Index
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