论文信息 - Tableaux and Dual Tableaux: Transformation of Proofs

Tableaux and Dual Tableaux: Transformation of Proofs

We present two proof systems for first-order logic with identity and without function symbols. The first one is an extension of the Rasiowa-Sikorski system with the rules for identity. This system is a validity checker. The rules of this system preserve and reflect validity of disjunctions of their premises and conclusions. The other is a Tableau system, which is an unsatisfiability checker. Its rules preserve and reflect unsatisfiability of conjunctions of their premises and conclusions. We show that the two systems are dual to each other. The duality is expressed in a formal way which enables us to define a transformation of proofs in one of the systems into the proofs of the other.

Joanna Golinska-Pilarek | Ewa Orlowska | E. Orlowska | Joanna Golinska-Pilarek

[1] Melvin Fitting,et al. First-Order Logic and Automated Theorem Proving , 1990, Graduate Texts in Computer Science.

[2] E. Beth. The foundations of mathematics : a study in the philosophy of science , 1959 .

[3] Ewa Orlowska,et al. Correspondence Results for Relational Proof Systems with Application to the Lambek Calculus , 2002, Stud Logica.

[4] Ullrich Hustadt,et al. Two Proof Systems for Peirce Algebras , 2003, RelMiCS.

[5] Evert W. Beth,et al. Semantic Entailment And Formal Derivability , 1955 .

[6] Beata Konikowska,et al. Rasiowa-Sikorski deduction systems in computer science applications , 2002, Theor. Comput. Sci..

[7] Ewa Orlowska. Relational Formalisation of Nonclassical Logics , 1997, Relational Methods in Computer Science.

[8] Ivo Düntsch,et al. A Proof System for Contact Relation Algebras , 2000, J. Philos. Log..

[9] Andrzej Wisniewski,et al. Socratic Proofs for Quantifiers★ , 2006, J. Philos. Log..

[10] Helena Rasiowa,et al. On the Gentzen theorem , 1959 .

[11] R. Sikorski,et al. The mathematics of metamathematics , 1963 .

[12] Sara Negri,et al. Structural proof theory , 2001 .

[13] R. Goodstein. FIRST-ORDER LOGIC , 1969 .

[14] G. Gentzen. Untersuchungen über das logische Schließen. I , 1935 .