We propose for the Effective Topos an alternative construction: a realisability framework composed of two levels of abstraction. This construction simplifies the proof that the Effective Topos is a topos (equipped with natural numbers), which is the main issue that this paper addresses. In this our work can be compared to Frey's monadic tripos-to-topos construction. However, no topos theory or even category theory is here required for the construction of the framework itself, which provides a semantics for higher-order type theories, supporting extensional equalities and the axiom of unique choice
Cette thèse est une contribution à la logique catégorique, plus précisement à la théorie des topos d...
We determine sufficient structure for an elementary topos to emulate E. Nelson's Internal Set Theory...
Hyland's effective topos offers an important realizability model for constructive mathematics in the...
We propose for the Effective Topos an alternative construction: a realisability framework composed o...
A topos is a category satisfying certain axioms. By satisfying the topos axioms, a category can be t...
AbstractThe modified realizability topos is the semantic (and higher order) counterpart of a variant...
Realizability toposes are "models of constructive set theory" based on abstract notions of computabi...
The modified realizability topos is the semantic (and higher order) counterpart of a variant of Krei...
The thesis is a comprehensive analysis of realizability toposes, which is divided into three central...
AbstractThe notion of ‘tripos’ was motivated by the desire to explain in what sense Higgs' descripti...
Abstract. An elementary topos is a nice way to generalize the notion of sets using categorical langu...
International audienceA common tendency in lexical semantics is to assume the existence of a hierarc...
AbstractSome old and new constructions of free categories with good properties (regularity, exactnes...
Using recent results in topos theory, two systems of higher-order logic are shown to be complete wit...
AbstractOne of the main goals of this paper is to give a construction of realizability models for pr...
Cette thèse est une contribution à la logique catégorique, plus précisement à la théorie des topos d...
We determine sufficient structure for an elementary topos to emulate E. Nelson's Internal Set Theory...
Hyland's effective topos offers an important realizability model for constructive mathematics in the...
We propose for the Effective Topos an alternative construction: a realisability framework composed o...
A topos is a category satisfying certain axioms. By satisfying the topos axioms, a category can be t...
AbstractThe modified realizability topos is the semantic (and higher order) counterpart of a variant...
Realizability toposes are "models of constructive set theory" based on abstract notions of computabi...
The modified realizability topos is the semantic (and higher order) counterpart of a variant of Krei...
The thesis is a comprehensive analysis of realizability toposes, which is divided into three central...
AbstractThe notion of ‘tripos’ was motivated by the desire to explain in what sense Higgs' descripti...
Abstract. An elementary topos is a nice way to generalize the notion of sets using categorical langu...
International audienceA common tendency in lexical semantics is to assume the existence of a hierarc...
AbstractSome old and new constructions of free categories with good properties (regularity, exactnes...
Using recent results in topos theory, two systems of higher-order logic are shown to be complete wit...
AbstractOne of the main goals of this paper is to give a construction of realizability models for pr...
Cette thèse est une contribution à la logique catégorique, plus précisement à la théorie des topos d...
We determine sufficient structure for an elementary topos to emulate E. Nelson's Internal Set Theory...
Hyland's effective topos offers an important realizability model for constructive mathematics in the...