CfP post-proceedings of TYPES 2022

TYPES is a major forum for the presentation of research on all aspects of type theory and its applications. TYPES 2022 was held from 20 to 25 June at LS2N, University of Nantes, France. The post-proceedings volume will be published in LIPIcs, Leibniz International Proceedings in Informatics, an open-access series of conference.

Submission Guidelines

Submission is open to everyone, also to those who did not participate in the TYPES 2022 conference. We welcome high-quality descriptions of original work, as well as position papers, overview papers, and system descriptions. Submissions should be written in English, and being original, i.e. neither previously published, nor simultaneously submitted to a journal or a conference.

• Papers have to be formatted with the current LIPIcs style and adhere to the style requirements of LIPIcs.
• The upper limit for the length of submissions is 20 pages, excluding bibliography (but including title and appendices).
• Papers have to be submitted as PDF. A link to the submission system will be made available on https://types22.inria.fr/.
• Authors have the option to attach to their submission a zip or tgz file containing code (formalised proofs or programs), but reviewers are not obliged to take the attachments into account and they will not be published.

Deadlines

• Abstract Submission : 31 October 2022 (AoE)
• Paper submission: 30 November 2022 (AoE)
• Author notification: 31 March 2022

List of Topics

The scope of the post-proceedings is the same as the scope of the conference: the theory and practice of type theory. In particular, we welcome submissions on the following topics:

• Foundations of type theory;
• Applications of type theory (e.g. linguistics or concurrency);
• Constructive mathematics;
• Dependently typed programming;
• Industrial uses of type theory technology;
• Meta-theoretic studies of type systems;
• Proof assistants and proof technology;
• Automation in computer-assisted reasoning;
• Links between type theory and functional programming;
• Formalising mathematics using type theory;
• Homotopy type theory and univalent mathematics.

For more information, see https://types22.inria.fr/ or contact the editors, Delia Kesner (Université Paris Cité, FR) at delia.kesner at irif.fr, or Pierre-Marie Pédrot (INRIA, FR) at pierre-marie.pedrot at inria.fr.