AbstractWe introduce and discuss a notion of strictly arithmetical completeness related to relative completeness of Cook (1978) and arithmetical completeness of Harel (1978). We present a powerful technique of obtaining strictly arithmetical axiomatizations of logics of programs. Given a model-theoretic semantics of a logic and a set of formulae defining (in a metalanguage) its nonclassical connectives, we automatically derive strictly arithmetically complete and sound proof systems for this logic. As examples of application of the technique we obtain new axiomatizations of algorithmic logic, (concurrent) dynamic logic and temporal logic
Programs are like constructive proofs of their specifications. This analogy is a precise equivalenc...
This thesis presents an axiomatic method for proving certain correctness properties of parallel pro...
International audienceAccording to the Church-Turing Thesis, effectively calculable functions are fu...
AbstractWe introduce and discuss a notion of strictly arithmetical completeness related to relative ...
The proof of completeness for propositional logic is a constructive one, so a computer program is su...
AbstractClark's program completion offers an intuitive first-order semantics for logic programs. Unf...
We advocate a declarative approach to proving properties of logic programs. Total correctness can be...
Proofs and countermodels are the two sides of completeness proofs, but, in general, failure to find ...
Abstract. This paper establishes a strong completeness property of composi-tional program logics for...
In [3], a large number of completeness results about variants of discrete linear-time temporal logic...
Building on work by Wainer and Wallen, formalised by James Mar-getson, we present soundness and comp...
AbstractA unified single proof is given which implies theorems in such diverse fields as continuous ...
The aim of this work is to use contemporary notation to build theory of Rosser logic, explain in det...
AbstractCerrito (1990) has proposed a declarative semantics for allowed logic programs using Girard'...
In this master thesis we investigate completeness theorems in the framework of abstract algebraic lo...
Programs are like constructive proofs of their specifications. This analogy is a precise equivalenc...
This thesis presents an axiomatic method for proving certain correctness properties of parallel pro...
International audienceAccording to the Church-Turing Thesis, effectively calculable functions are fu...
AbstractWe introduce and discuss a notion of strictly arithmetical completeness related to relative ...
The proof of completeness for propositional logic is a constructive one, so a computer program is su...
AbstractClark's program completion offers an intuitive first-order semantics for logic programs. Unf...
We advocate a declarative approach to proving properties of logic programs. Total correctness can be...
Proofs and countermodels are the two sides of completeness proofs, but, in general, failure to find ...
Abstract. This paper establishes a strong completeness property of composi-tional program logics for...
In [3], a large number of completeness results about variants of discrete linear-time temporal logic...
Building on work by Wainer and Wallen, formalised by James Mar-getson, we present soundness and comp...
AbstractA unified single proof is given which implies theorems in such diverse fields as continuous ...
The aim of this work is to use contemporary notation to build theory of Rosser logic, explain in det...
AbstractCerrito (1990) has proposed a declarative semantics for allowed logic programs using Girard'...
In this master thesis we investigate completeness theorems in the framework of abstract algebraic lo...
Programs are like constructive proofs of their specifications. This analogy is a precise equivalenc...
This thesis presents an axiomatic method for proving certain correctness properties of parallel pro...
International audienceAccording to the Church-Turing Thesis, effectively calculable functions are fu...