Add to ORKGVersion 2 fixes some typos from version 1.Version 3 fixes a typo in a typing rule from version 2.In order to avoid well-know paradoxes associated with self-referential definitions, higher-order dependent type theories stratify the theory using a countably infinite hierarchy of universes (also known as sorts), Type 0 : Type 1 : · · ·. Such type systems are called cumulative if for any type A we have that A : Type i implies A : Type i+1. The predicative calculus of inductive constructions (pCIC) which forms the basis of the Coq proof assistant, is one such system. In this paper we present and establish the soundness of the predicative calculus of cumulative inductive constructions (pCuIC) which extends the cumulativity relation to inductive t...
International audienceIn a previous work, we proved that almost all of the Calculus of Inductive Con...
International audienceWe propose an extension of pure type systems with an algebraic presentation of...
International audienceWe propose an extension of pure type systems with an algebraic presentation of...
Version 2 fixes some typos from version 1.Version 3 fixes a typo in a typing rule from version 2.In ...
In order to avoid well-known paradoxes associated with self-referential definitions, higher-order de...
International audienceIn order to avoid well-known paradoxes associated with self-referential defini...
International audienceIn order to avoid well-known paradoxes associated with self-referential defini...
© Amin Timany and Matthieu Sozeau; licensed under Creative Commons License CC-BY. In order to avoid ...
In order to avoid well-known paradoxes associated with self-referential definitions, higher-order de...
We discuss our on-going research on making inductive types cumulative in the predicative calculus of...
Having the type of all types in a type system results in paradoxes like Russel’s paradox. Therefore ...
Having the type of all types in a type system results in paradoxes like Russel’s paradox. Therefore ...
AbstractLuo's Extended Calculus of Constructions (ECC) is a higher order functional calculus based o...
Journal version of TLCA'03International audienceIn a previous work, we proved that an important part...
International audienceIn a previous work, we proved that almost all of the Calculus of Inductive Con...
International audienceIn a previous work, we proved that almost all of the Calculus of Inductive Con...
International audienceWe propose an extension of pure type systems with an algebraic presentation of...
International audienceWe propose an extension of pure type systems with an algebraic presentation of...
Version 2 fixes some typos from version 1.Version 3 fixes a typo in a typing rule from version 2.In ...
In order to avoid well-known paradoxes associated with self-referential definitions, higher-order de...
International audienceIn order to avoid well-known paradoxes associated with self-referential defini...
International audienceIn order to avoid well-known paradoxes associated with self-referential defini...
© Amin Timany and Matthieu Sozeau; licensed under Creative Commons License CC-BY. In order to avoid ...
In order to avoid well-known paradoxes associated with self-referential definitions, higher-order de...
We discuss our on-going research on making inductive types cumulative in the predicative calculus of...
Having the type of all types in a type system results in paradoxes like Russel’s paradox. Therefore ...
Having the type of all types in a type system results in paradoxes like Russel’s paradox. Therefore ...
AbstractLuo's Extended Calculus of Constructions (ECC) is a higher order functional calculus based o...
Journal version of TLCA'03International audienceIn a previous work, we proved that an important part...
International audienceIn a previous work, we proved that almost all of the Calculus of Inductive Con...
International audienceIn a previous work, we proved that almost all of the Calculus of Inductive Con...
International audienceWe propose an extension of pure type systems with an algebraic presentation of...
International audienceWe propose an extension of pure type systems with an algebraic presentation of...