International audienceGenerally, ontological relations are modeled using fragments of first order logic (FOL) and difficulties arise when meta-reasoning is done over ontological properties, leading to reason outside the logic. Moreover, when such systems are used to reason about knowledge and meta-knowledge, classical languages are not able to cope with different levels of abstraction in a clear and simple way. In order to address these problems, we suggest a formal framework using a dependent (higher order) type theory. It maximizes the expressiveness while preserving decidability of type checking and results in a coherent theory. Two examples of meta-reasoning with transitivity and distributivity and a case study illustrate this approach
Combining Higher Order Abstract Syntax (HOAS) and (co)induction is well known to be problematic. In ...
We present a theory of dependent types with explicit substitutions. We follow a meta-theoretical app...
AbstractWe study how the type theory Fω can be adequately represented in the meta-logical framework ...
International audienceGenerally, ontological relations are modeled using fragments of first order lo...
International audienceGenerally, mereological relations are modeled using fragments of first-order l...
International audienceGenerally, part-whole relations are modeled using fragments of first-order log...
International audienceIn the area of knowledge representation, a challenging topic is the formalizat...
International audienceIn the domain of ontology design as well as in Conceptual Modeling, representi...
International audienceIn the domain of ontology design as well as in Knowledge Representation, model...
International audienceSince the last decade the wide spread language for expressing ontologies relie...
We present a foundation for a computational meta-theory of languages with bindings implemented in a ...
AbstractIt is well-known that one can build models of full higher-order dependent type theory (a.k.a...
. We describe a method for constructing a model of second order dependent type theory out of a model...
When writing proofs, it is desirable to show that one’s proof is correct. With formalising a proof i...
Contextual type theories are largely explored in their applications to programming languages, but le...
Combining Higher Order Abstract Syntax (HOAS) and (co)induction is well known to be problematic. In ...
We present a theory of dependent types with explicit substitutions. We follow a meta-theoretical app...
AbstractWe study how the type theory Fω can be adequately represented in the meta-logical framework ...
International audienceGenerally, ontological relations are modeled using fragments of first order lo...
International audienceGenerally, mereological relations are modeled using fragments of first-order l...
International audienceGenerally, part-whole relations are modeled using fragments of first-order log...
International audienceIn the area of knowledge representation, a challenging topic is the formalizat...
International audienceIn the domain of ontology design as well as in Conceptual Modeling, representi...
International audienceIn the domain of ontology design as well as in Knowledge Representation, model...
International audienceSince the last decade the wide spread language for expressing ontologies relie...
We present a foundation for a computational meta-theory of languages with bindings implemented in a ...
AbstractIt is well-known that one can build models of full higher-order dependent type theory (a.k.a...
. We describe a method for constructing a model of second order dependent type theory out of a model...
When writing proofs, it is desirable to show that one’s proof is correct. With formalising a proof i...
Contextual type theories are largely explored in their applications to programming languages, but le...
Combining Higher Order Abstract Syntax (HOAS) and (co)induction is well known to be problematic. In ...
We present a theory of dependent types with explicit substitutions. We follow a meta-theoretical app...
AbstractWe study how the type theory Fω can be adequately represented in the meta-logical framework ...