From mboxrd@z Thu Jan 1 00:00:00 1970 X-Spam-Checker-Version: SpamAssassin 3.4.4 (2020-01-24) on inbox.vuxu.org X-Spam-Level: ** X-Spam-Status: No, score=2.2 required=5.0 tests=DATE_IN_PAST_24_48, DKIM_ADSP_CUSTOM_MED,FORGED_GMAIL_RCVD,FREEMAIL_FROM, LOCALPART_IN_SUBJECT,RCVD_IN_MSPIKE_H2,SPOOFED_FREEMAIL, SPOOF_GMAIL_MID autolearn=no autolearn_force=no version=3.4.4 Received: (qmail 1968 invoked from network); 8 Feb 2023 19:52:18 -0000 Received: from smtp2.mta.ca (198.164.44.75) by inbox.vuxu.org with ESMTPUTF8; 8 Feb 2023 19:52:18 -0000 Received: from rr.mta.ca ([198.164.44.159]:41706) by smtp2.mta.ca with esmtp (Exim 4.80) (envelope-from ) id 1pPqTT-0007vh-9h; Wed, 08 Feb 2023 15:51:23 -0400 Received: from majordomo by rr.mta.ca with local (Exim 4.92.1) (envelope-from ) id 1pPqRy-000148-Kd for categories-list@rr.mta.ca; Wed, 08 Feb 2023 15:49:50 -0400 MIME-Version: 1.0 From: Jonathan Weinberger Date: Tue, 7 Feb 2023 14:31:45 -0500 Subject: categories: HoTT/UF 2023: 2nd Call for Contributions To: categories@mta.ca Content-Type: text/plain; charset="UTF-8" Content-Transfer-Encoding: quoted-printable Precedence: bulk Reply-To: Jonathan Weinberger Message-Id: =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D= =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D= =3D=3D=3D=3D=3D=3D=3D=3D 2ND CALL FOR CONTRIBUTIONS AND PARTICIPATION Workshop on Homotopy Type Theory and Univalent Foundations (HoTT/UF 2023, co-located with WG6 meeting of the EuroProofNet COST action) =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D= =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D= =3D=3D=3D=3D=3D=3D=3D=3D ------------------------------------------------------------------------ Workshop on Homotopy Type Theory and Univalent Foundations April 22 - 23, 2023, Vienna, Austria https://hott-uf.github.io/2023/ Co-located with WG6 meeting in Vienna in April 2023 https://europroofnet.github.io/wg6-vienna/ Abstract submission deadline: Feb 17, 2023 ------------------------------------------------------------------------ Homotopy Type Theory is a young area of logic, combining ideas from several established fields: the use of dependent type theory as a foundation for mathematics, inspired by ideas and tools from abstract homotopy theory. Univalent Foundations are foundations of mathematics based on the homotopical interpretation of type theory. The goal of this workshop is to bring together researchers interested in all aspects of Homotopy Type Theory/Univalent Foundations: from the study of syntax and semantics of type theory to practical formalization in proof assistants based on univalent type theory. The workshop will be held in person with support for remote participation. We encourage online participation for those who do not wish to or cannot travel. =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D= =3D=3D=3D # Invited speakers * Greta Coraglia (University of Genova, Italy) * Nima Rasekh (Max Planck Institute for Mathematics, Germany) * Egbert Rijke (University of Ljubljana, Slovenia) =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D # Submissions * Abstract submission deadline: February 17, 2023 * Author notification: early March 2023 Submissions should consist of a title and a 1-2 pages abstract, in pdf format, via https://easychair.org/conferences/?conf=3Dhottuf2023. Considering the broad background of the expected audience, we encourage authors to include information of pedagogical value in their abstract, such as motivation and context of their work. =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D # Registration Registration is mandatory. Registration information will be provided shortl= y. =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D # Program committee * Ulrik Buchholtz (University of Nottingham) * Evan Cavallo (Stockholm University) * Tom de Jong (University of Nottingham) * Paige North (Utrecht University) * Anja Petkovi=C4=87 Komel (TU Wien) * Christian Sattler (Chalmers University of Technology) * Michael Shulman (University of San Diego) * Kristina Sojakova (INRIA Paris) * Jon Sterling (Aarhus University) * Taichi Uemura (Stockholm University) * Jonathan Weinberger (Johns Hopkins University) * Th=C3=A9o Winterhalter (INRIA Saclay and LMF) =3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D=3D # Organizers * Evan Cavallo, evan.cavallo@math.su.se (Stockholm University) * Anja Petkovi=C4=87 Komel, anja.komel@tuwien.ac.at (TU Wien) * Taichi Uemura, taichi.uemura@math.su.se (Stockholm University) * Jonathan Weinberger, jweinb20@jhu.edu (Johns Hopkins University) [For admin and other information see: http://www.mta.ca/~cat-dist/ ]