The ??-calculus modulo theory is a logical framework in which various logics and type systems can be encoded, thus helping the cross-verification and interoperability of proof systems based on those logics and type systems. In this paper, we show how to encode predicate subtyping and proof irrelevance, two important features of the PVS proof assistant. We prove that this encoding is correct and that encoded proofs can be mechanically checked by Dedukti, a type checker for the ??-calculus modulo theory using rewriting
Dedukti is a Logical Framework based on the λΠ-Calculus Modulo Theory. We show that many theories ca...
International audienceThis paper provides a new presentation of the λΠ-calculus modulo where the add...
In recent years, the emergence of feature rich and mature interactive proof assistants has enabled l...
TYPES 2020 wasn't held in Turin as planned because of the COVID-19 outbreak.International audienceTh...
International audienceThe λΠ-calculus modulo theory is a logical framework in which many logical sys...
We present a shallow embedding of the Object Calculus of Abadi and Cardelli in the λΠ-calculus modul...
The $\lambda\Pi$-calculus modulo theory is a logical framework in which many type systems can be exp...
Adding predicate subtyping to higher-order logic yields a very expressive language in which type-che...
We present a Natural Deduction proof system for the pro- positional modal \u3bc-calculus, and its fo...
AbstractWe present a natural deduction proof system for the propositional modal μ-calculus and its f...
Safe programming as well as most proof systems rely on typing. The more a type system is expressive,...
International audienceThe λΠ -calculus forms one of the vertices in Barendregt's -cube and has been ...
We present and discuss various formal]zations of Modal Logics in Logical Frameworks based on Type Th...
Dedukti is a Logical Framework based on the λΠ-Calculus Modulo Theory. We show that many theories ca...
International audienceThis paper provides a new presentation of the λΠ-calculus modulo where the add...
In recent years, the emergence of feature rich and mature interactive proof assistants has enabled l...
TYPES 2020 wasn't held in Turin as planned because of the COVID-19 outbreak.International audienceTh...
International audienceThe λΠ-calculus modulo theory is a logical framework in which many logical sys...
We present a shallow embedding of the Object Calculus of Abadi and Cardelli in the λΠ-calculus modul...
The $\lambda\Pi$-calculus modulo theory is a logical framework in which many type systems can be exp...
Adding predicate subtyping to higher-order logic yields a very expressive language in which type-che...
We present a Natural Deduction proof system for the pro- positional modal \u3bc-calculus, and its fo...
AbstractWe present a natural deduction proof system for the propositional modal μ-calculus and its f...
Safe programming as well as most proof systems rely on typing. The more a type system is expressive,...
International audienceThe λΠ -calculus forms one of the vertices in Barendregt's -cube and has been ...
We present and discuss various formal]zations of Modal Logics in Logical Frameworks based on Type Th...
Dedukti is a Logical Framework based on the λΠ-Calculus Modulo Theory. We show that many theories ca...
International audienceThis paper provides a new presentation of the λΠ-calculus modulo where the add...
In recent years, the emergence of feature rich and mature interactive proof assistants has enabled l...