AbstractThe algebraic and recursive structure of countable languages of classical first-order logic with equality is analysed. All languages of finite undecidable similarity type are shown to be algebraically and recursively equivalent in the following sense: their Boolean algebras of formulas are, after trivial involving the one element models of the languages have been excepted, recursively isomorphic by a map which preserves the degree of recursiveness of their models
In this paper, we prove that every countable set of formulas of the propositional logic has at least...
In a previous paper, we introduced the notion of Boolean-like algebra as a generalisation of Boolean...
AbstractFrom a logical point of view, Stone duality for Boolean algebras relates theories in classic...
AbstractThe algebraic and recursive structure of countable languages of classical first-order logic ...
We begin with a disucssion of some of the serious deficiencies of first order predicate languages. T...
We prove the following completeness result about classical realizability: given any Boolean algebra ...
AbstractThe notion of bisimulation is an important concept in process algebra and modern modal logic...
We consider an extension of first-order logic with a recursion operator that corresponds to allowing...
A Boolean algebra is a structure which behaves very much like first order propositional logic. In th...
In this paper, we will present a definability theorem for first order logic.This theorem is very eas...
We prove that algebras of binary relations whose similarity type includes intersection, composition,...
AbstractIn this paper we study a first-order language that allows to express and prove properties re...
AbstractThe language of our Boolean logic with relations is a Boolean language to which relation sym...
International audienceWe prove the following completeness result about classical realizability: give...
We prove that algebras of binary relations whose similarity type includes intersection, composition,...
In this paper, we prove that every countable set of formulas of the propositional logic has at least...
In a previous paper, we introduced the notion of Boolean-like algebra as a generalisation of Boolean...
AbstractFrom a logical point of view, Stone duality for Boolean algebras relates theories in classic...
AbstractThe algebraic and recursive structure of countable languages of classical first-order logic ...
We begin with a disucssion of some of the serious deficiencies of first order predicate languages. T...
We prove the following completeness result about classical realizability: given any Boolean algebra ...
AbstractThe notion of bisimulation is an important concept in process algebra and modern modal logic...
We consider an extension of first-order logic with a recursion operator that corresponds to allowing...
A Boolean algebra is a structure which behaves very much like first order propositional logic. In th...
In this paper, we will present a definability theorem for first order logic.This theorem is very eas...
We prove that algebras of binary relations whose similarity type includes intersection, composition,...
AbstractIn this paper we study a first-order language that allows to express and prove properties re...
AbstractThe language of our Boolean logic with relations is a Boolean language to which relation sym...
International audienceWe prove the following completeness result about classical realizability: give...
We prove that algebras of binary relations whose similarity type includes intersection, composition,...
In this paper, we prove that every countable set of formulas of the propositional logic has at least...
In a previous paper, we introduced the notion of Boolean-like algebra as a generalisation of Boolean...
AbstractFrom a logical point of view, Stone duality for Boolean algebras relates theories in classic...