Tag: Jonathan Sterling
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Discussing “First Steps in Synthetic Tait Computability: The Objective Metatheory of Cubical Type Theory”
I’ve been meaning to get more familiar with this dissertation for a while (reading it thoroughly would take longer than the week I try to take for my blog posts), after its ideas were used in a paper I discussed last year. This thesis presents a new technique, synthetic Tait computability, for proving the ‘syntactic’…
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1996 2000 2001 2014 2019 2020 2021 2023 Abhishek Anand Cambridge Tracts in Theoretical Computer Science Carnegie Mellon University City University of New York Coq Cubical Type Theory Cyril Cohen Fabian Kunze intuitionistic logic intuitionistic modal logic Jonathan Sterling Journal of Automated Reasoning LICS LORIA Maarten de Rijke Matthieu Sozeau Melvin Fitting Metaprogramming modal logic nested sequent calculus Notre Dame Journal of Formal Logic Patrick Blackburn Princeton University Proof theory Rocq sequent calculus Simon Boulier TABLEAUX types type theory University of Amsterdam University of Birmingham University of Cambridge University of Oxford Valeria de Paiva Yannick Forster Yde Venema