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
. The circuit complexity classes AC 0 ; ACC; and CC (also called pure-ACC) can be characterized as...
Abstract. The theory of abstract algebraic logic aims at drawing a strong bridge between logic and u...
The Keisler theorems dealing with the definability in first-order logic of classes of structures are...
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...
AbstractWe study the Boolean algebras R,CS,D of regular languages, context-sensitive languages and d...
AbstractIn this paper we study a first-order language that allows to express and prove properties re...
International audienceWe prove the following completeness result about classical realizability: give...
In this paper, we prove that every countable set of formulas of the propositional logic has at least...
We study the Boolean algebras R, CS, D of regular languages, context-sensitive languages and decidab...
This bachelor thesis is dealing with complete Boolean algebras and its use in semantics of first-ord...
We formally assessed four different algebraic descriptions of classical propositional logic. We defi...
In this paper we will present a definability theorem for first order logic This theorem is very easy...
A Boolean algebra is a structure which behaves very much like first order propositional logic. In th...
We will study Lindenbaum algebras and algebras of definable subsets of selected first order theories...
. The circuit complexity classes AC 0 ; ACC; and CC (also called pure-ACC) can be characterized as...
Abstract. The theory of abstract algebraic logic aims at drawing a strong bridge between logic and u...
The Keisler theorems dealing with the definability in first-order logic of classes of structures are...
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...
AbstractWe study the Boolean algebras R,CS,D of regular languages, context-sensitive languages and d...
AbstractIn this paper we study a first-order language that allows to express and prove properties re...
International audienceWe prove the following completeness result about classical realizability: give...
In this paper, we prove that every countable set of formulas of the propositional logic has at least...
We study the Boolean algebras R, CS, D of regular languages, context-sensitive languages and decidab...
This bachelor thesis is dealing with complete Boolean algebras and its use in semantics of first-ord...
We formally assessed four different algebraic descriptions of classical propositional logic. We defi...
In this paper we will present a definability theorem for first order logic This theorem is very easy...
A Boolean algebra is a structure which behaves very much like first order propositional logic. In th...
We will study Lindenbaum algebras and algebras of definable subsets of selected first order theories...
. The circuit complexity classes AC 0 ; ACC; and CC (also called pure-ACC) can be characterized as...
Abstract. The theory of abstract algebraic logic aims at drawing a strong bridge between logic and u...
The Keisler theorems dealing with the definability in first-order logic of classes of structures are...
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