Exploring Synthetic Tait Computability: Foundations of Cubical Type Theory 🧩
Discover the groundbreaking metatheoretical framework for dependent type theories, focusing on the implementation and semantics of Cubical Type Theory in this thesis defense.
Jonathan Sterling
983 views • Sep 23, 2021
About this video
[Thesis Defense]
The implementation and semantics of dependent type theories can be studied in a syntax-independent way: the objective metatheory of dependent type theories exploits the universal properties of their syntactic categories to endow them with computational content, mathematical meaning, and practical implementation (normalization, type checking, elaboration). The semantic methods of the objective metatheory inform the design and implementation of correct-by-construction elaboration algorithms, promising a principled interface between real proof assistants and ideal mathematics.
In this dissertation, I add synthetic Tait computability to the arsenal of the objective metatheorist. Synthetic Tait computability is a mathematical machine to reduce difficult problems of type theory and programming languages to trivial theorems of topos theory. First employed by Sterling and Harper to reconstruct the theory of program modules and their phase separated parametricity, synthetic Tait computability is deployed here to resolve the last major open question in the syntactic metatheory of cubical type theory: normalization of open terms.
Thesis Committee:
Robert Harper, Chair
Jeremy Avigad
Karl Crary
Lars Birkedal, Aarhus University
Kuen-Bang Hou (Favonia), University of Minnesota
The implementation and semantics of dependent type theories can be studied in a syntax-independent way: the objective metatheory of dependent type theories exploits the universal properties of their syntactic categories to endow them with computational content, mathematical meaning, and practical implementation (normalization, type checking, elaboration). The semantic methods of the objective metatheory inform the design and implementation of correct-by-construction elaboration algorithms, promising a principled interface between real proof assistants and ideal mathematics.
In this dissertation, I add synthetic Tait computability to the arsenal of the objective metatheorist. Synthetic Tait computability is a mathematical machine to reduce difficult problems of type theory and programming languages to trivial theorems of topos theory. First employed by Sterling and Harper to reconstruct the theory of program modules and their phase separated parametricity, synthetic Tait computability is deployed here to resolve the last major open question in the syntactic metatheory of cubical type theory: normalization of open terms.
Thesis Committee:
Robert Harper, Chair
Jeremy Avigad
Karl Crary
Lars Birkedal, Aarhus University
Kuen-Bang Hou (Favonia), University of Minnesota
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Views
983
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53
Duration
50:44
Published
Sep 23, 2021
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