A roughly taxonomised listing of some of the papers on Homotopy Type Theory. Titles link to more details, bibdata, etc. Currently very incomplete; please add!
Type theory and homotopy.Steve Awodey, 2010. (To appear.) PDF
Homotopy type theory and Voevodsky’s univalent foundations.Álvaro Pelayo and Michael A. Warren, 2012. (Bulletin of the AMS, forthcoming) arXiv
Voevodsky’s Univalence Axiom in homotopy type theory.Steve Awodey, Álvaro Pelayo, and Michael A. Warren, October 2013, Notices of the American Mathematical Society 60(08), pp.1164-1167. arXiv
Homotopy Type Theory: A synthetic approach to higher equalities. Michael Shulman. To appear in Categories for the working philosopher; arXiv
Univalent Foundations and the UniMath library.Anthony Bordg, 2017. PDF
Homotopy type theory: the logic of space. Michael Shulman. To appear in New Spaces in Mathematics and Physics: arxiv
An introduction to univalent foundations for mathematicians. Dan Grayson, arxiv
A self-contained, brief and complete formulation of Voevodsky’s Univalence Axiom. Martín Escardó, web, arxiv
A proposition is the (homotopy) type of its proofs. Steve Awodey. arxiv, 2017
The groupoid interpretation of type theory.Thomas Streicher? and Martin Hofmann?, in Sambin (ed.) et al., Twenty-five years of constructive type theory. Proceedings of a congress, Venice, Italy, October 19?21, 1995. Oxford: Clarendon Press. Oxf. Logic Guides. 36, 83-111 (1998). PostScript
Homotopy theoretic aspects of constructive type theory.Michael A. Warren, Ph.D. thesis: Carnegie Mellon University, 2008. PDF
Two-dimensional models of type theory, Richard Garner, Mathematical Structures in Computer Science 19 (2009), no. 4, pages 687–736. RG’s website
Topological and simplicial models of identity types.Richard Garner and Benno van den Berg, to appear in ACM Transactions on Computational Logic (TOCL). PDF
The strict ∞-groupoid interpretation of type theoryMichael Warren, in Models, Logics and Higher-Dimensional Categories: A Tribute to the Work of Mihály Makkai, AMS/CRM, 2011. PDF
Homotopy-Theoretic Models of Type Theory.Peter Arndt and Chris Kapulkin. In Typed Lambda Calculi and Applications, volume 6690 of Lecture Notes in Computer Science, pages 45?60. arXiv
Combinatorial realizability models of type theory, Pieter Hofstra and Michael A. Warren, 2013, Annals of Pure and Applied Logic 164(10), pp. 957-988. arXiv
The local universes model: an overlooked coherence construction for dependent type theories, Peter LeFanu Lumsdaine, Michael A. Warren, to appear in ACM Transactions on Computational Logic, 2014. arXiv
Products of families of types in the C-systems defined by a universe category, Vladimir Voevodsky, 2015. arXiv
Martin-Lof identity types in the C-systems defined by a universe category, Vladimir Voevodsky, 2015. arXiv
The Frobenius Condition, Right Properness, and Uniform Fibrations, Nicola Gambino, Christian Sattler?. arXiv
Semantics of higher inductive types. Michael Shulman and Peter LeFanu Lumsdaine, arXiv
A Descent Property for the Univalent Foundations, Egbert Rijke, doi
Impredicative Encodings of (Higher) Inductive Types. Steve Awodey, Jonas Frey, and Sam Speight. arxiv, 2018
W-Types with Reductions and the Small Object Argument, Andrew Swan, arxiv
Formalizations
An experimental library of formalized Mathematics based on the univalent foundations, Vladimir Voevodsky, Math. Structures Comput. Sci. 25 (2015), no. 5, pp 1278-1294, 2015. arXivjournal
A preliminary univalent formalization of the p-adic numbers. Álvaro Pelayo, Vladimir Voevodsky, Michael A. Warren, 2012. arXiv
Univalent categories and the Rezk completion. Benedikt Ahrens, Chris Kapulkin, Michael Shulman, Math. Structures Comput. Sci. 25 (2015), no. 5, 1010?1039. arXiv:1303.0584 (on internal categories in HoTT)
The HoTT Library: A formalization of homotopy type theory in Coq, Andrej Bauer, Jason Gross, Peter LeFanu Lumsdaine, Mike Shulman, Matthieu Sozeau, Bas Spitters, 2016 arxiv
Applications to computing
Homotopical patch theory. Carlo Angiuli, Ed Morehouse, Dan Licata, Robert Harper, PDF
Guarded Cubical Type Theory: Path Equality for Guarded Recursion, Lars Birkedal, Ale? Bizjak, Ranald Clouston, Hans Bugge Grathwohl, Bas Spitters, Andrea Vezzosi, arXiv
The Frobenius Condition, Right Properness, and Uniform Fibrations, Nicola Gambino, Christian Sattler?. (Note: this is a duplicate of an entry in the section “General Models” above; accident?) arXiv
Weak ∞-Categories from Intensional Type Theory.Peter LeFanu Lumsdaine, TLCA 2009, Brasília, Logical Methods in Computer Science, Vol. 6, issue 23, paper 24. PDF
Higher Categories from Type Theories.Peter LeFanu Lumsdaine, PhD Thesis: Carnegie Mellon University, 2010. PDF
Structuralism, Invariance, and Univalence. Steve Awodey. Philosophia Mathematica (2014) 22 (1): 1-11. online
Identity in Homotopy Type Theory, Part I: The Justification of Path Induction. James Ladyman and Stuart Presnell. Philosophia Mathematica (2015), online
Homotopy Type Theory: A synthetic approach to higher equalities. Michael Shulman. To appear in Categories for the working philosopher; arXiv