AbstractIn this paper we present and study a categorical formulation of the W-types of Martin-Löf. These are essentially free term algebras where the operations may have finite or infinite arity. It is shown that W-types are preserved under the construction of sheaves and Artin gluing. In the proofs we avoid using impredicative or nonconstructive principles
International audienceWe show that a version of Martin-Löf type theory with an extensional identity ...
AbstractWe define algebraic structure on a locally finitely presentable W-category for a locally fin...
Coinductive data types are used in functional programming to represent infinite data struc-tures. Ex...
AbstractIn this paper we present and study a categorical formulation of the W-types of Martin-Löf. T...
this paper, we give an abstract 2 categorical characterization of W-types. We calculate these W-typ...
This thesis contributes to the semantics of Martin-Lof type theory and the theory of polynomial func...
Abstract. We show that strictly positive inductive types, constructed from polynomial functors, cons...
We set out to study the consequences of the assumption of types of wellfounded trees in dependent ty...
We set out to study the consequences of the assumption of types of wellfounded trees in dependent ty...
Abstract. We show that strictly positive inductive types, constructed from polynomial functors, cons...
We set out to study the consequences of the assumption of types of wellfounded trees in dependent ty...
We show that a version of Martin-Lof type theory with an extensional identity type former I, a unit ...
We present a construction of W-types in the setoid model of extensionalMartin-L\"of type theory usin...
International audienceWe show that a version of Martin-Löf type theory with an extensional identity ...
International audienceWe show that a version of Martin-Löf type theory with extensional identity, a ...
International audienceWe show that a version of Martin-Löf type theory with an extensional identity ...
AbstractWe define algebraic structure on a locally finitely presentable W-category for a locally fin...
Coinductive data types are used in functional programming to represent infinite data struc-tures. Ex...
AbstractIn this paper we present and study a categorical formulation of the W-types of Martin-Löf. T...
this paper, we give an abstract 2 categorical characterization of W-types. We calculate these W-typ...
This thesis contributes to the semantics of Martin-Lof type theory and the theory of polynomial func...
Abstract. We show that strictly positive inductive types, constructed from polynomial functors, cons...
We set out to study the consequences of the assumption of types of wellfounded trees in dependent ty...
We set out to study the consequences of the assumption of types of wellfounded trees in dependent ty...
Abstract. We show that strictly positive inductive types, constructed from polynomial functors, cons...
We set out to study the consequences of the assumption of types of wellfounded trees in dependent ty...
We show that a version of Martin-Lof type theory with an extensional identity type former I, a unit ...
We present a construction of W-types in the setoid model of extensionalMartin-L\"of type theory usin...
International audienceWe show that a version of Martin-Löf type theory with an extensional identity ...
International audienceWe show that a version of Martin-Löf type theory with extensional identity, a ...
International audienceWe show that a version of Martin-Löf type theory with an extensional identity ...
AbstractWe define algebraic structure on a locally finitely presentable W-category for a locally fin...
Coinductive data types are used in functional programming to represent infinite data struc-tures. Ex...
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