In this talk, we will develop a type theory that is based solely on dependent inductive and coinductive types. By this we mean that the only way to form new types is by specifying the type of their corresponding constructors or destructors, respectively. From such a specification, we get the corresponding recursion and corecursion principles. One might be tempted to think that such a theory is relatively weak as, for example, there is no function space type. However, as it turns out, the function space is definable as a coinductive type. In fact, we can encode the connectives of intuitionistic predicate logic: falsity, conjunction, disjunction, dependent function space, existential quantification, and equality. Further, well-known types lik...
We present two Dialectica-like constructions for models of intensional Martin-Löf type theory based ...
In this paper we study subtyping for inductive types in dependent type theories in the farmework of ...
In this paper we study subtyping for inductive types in dependent type theories in the farmework of ...
Contains fulltext : 161438.pdf (preprint version ) (Open Access)LICS 2016 : Thirty...
In this paper, I establish the categorical structure necessary to interpret dependent inductive and ...
Abstract. We introduce logic-enriched intuitionistic type theories, that extend intuitionistic depen...
Type theories can provide a foundational account of constructive mathematics, and for the computer s...
Coinductive data types are used in functional programming to represent infinite data struc-tures. Ex...
This paper examines the connections between intuitionistic type theory and category theory. A versi...
We introduce logic-enriched intuitionistic type theories, that extend intuitionistic dependent type ...
We describe a way to represent computable functions between coinductive types as particular transduc...
Real world programming languages crucially depend on the availability of computational effects to ac...
This dissertation defends the idea of a closed dependent type theory whose inductive types are encod...
We present the type theory CaTT, originally introduced by Finster and Mimram to describe globular we...
We present a principle for introducing new types in type theory which generalises strictly positive ...
We present two Dialectica-like constructions for models of intensional Martin-Löf type theory based ...
In this paper we study subtyping for inductive types in dependent type theories in the farmework of ...
In this paper we study subtyping for inductive types in dependent type theories in the farmework of ...
Contains fulltext : 161438.pdf (preprint version ) (Open Access)LICS 2016 : Thirty...
In this paper, I establish the categorical structure necessary to interpret dependent inductive and ...
Abstract. We introduce logic-enriched intuitionistic type theories, that extend intuitionistic depen...
Type theories can provide a foundational account of constructive mathematics, and for the computer s...
Coinductive data types are used in functional programming to represent infinite data struc-tures. Ex...
This paper examines the connections between intuitionistic type theory and category theory. A versi...
We introduce logic-enriched intuitionistic type theories, that extend intuitionistic dependent type ...
We describe a way to represent computable functions between coinductive types as particular transduc...
Real world programming languages crucially depend on the availability of computational effects to ac...
This dissertation defends the idea of a closed dependent type theory whose inductive types are encod...
We present the type theory CaTT, originally introduced by Finster and Mimram to describe globular we...
We present a principle for introducing new types in type theory which generalises strictly positive ...
We present two Dialectica-like constructions for models of intensional Martin-Löf type theory based ...
In this paper we study subtyping for inductive types in dependent type theories in the farmework of ...
In this paper we study subtyping for inductive types in dependent type theories in the farmework of ...