TY - GEN
T1 - Canonical propositional Gentzen-type systems
AU - Avron, Arnon
AU - Lev, Iddo
PY - 2001
Y1 - 2001
N2 - Canonical propositional Gentzen-type systems are systems which in addition to the standard axioms and structural rules have only pure logical rules which have the subformula property, introduce exactly one occurrence of a connective in their conclusion, and no other occurrence of any connective is mentioned anywhere else in their formulation. We provide a constructive coherence criterion for the non-triviality of such systems, and show that a system of this kind admits cut elimination iff it is coherent. We show also that the semantics of such systems is provided by non-deterministic two-valued matrices (2-Nmatrices). 2-Nmatrices form a natural generalization of the classical two-valued matrix, and every coherent canonical system is sound and complete for one of them. Conversely, with any 2-Nmatrix it is possible to associate a coherent canonical Gentzen-type system which has for each connective at most one introduction rule for each side, and is sound and complete for that 2-Nmatrix. We show also that every coherent canonical Gentzen-type system either defines a fragment of the classical two-valued logic, or a logic which has no finite characteristic matrix.
AB - Canonical propositional Gentzen-type systems are systems which in addition to the standard axioms and structural rules have only pure logical rules which have the subformula property, introduce exactly one occurrence of a connective in their conclusion, and no other occurrence of any connective is mentioned anywhere else in their formulation. We provide a constructive coherence criterion for the non-triviality of such systems, and show that a system of this kind admits cut elimination iff it is coherent. We show also that the semantics of such systems is provided by non-deterministic two-valued matrices (2-Nmatrices). 2-Nmatrices form a natural generalization of the classical two-valued matrix, and every coherent canonical system is sound and complete for one of them. Conversely, with any 2-Nmatrix it is possible to associate a coherent canonical Gentzen-type system which has for each connective at most one introduction rule for each side, and is sound and complete for that 2-Nmatrix. We show also that every coherent canonical Gentzen-type system either defines a fragment of the classical two-valued logic, or a logic which has no finite characteristic matrix.
UR - http://www.scopus.com/inward/record.url?scp=84867754522&partnerID=8YFLogxK
U2 - 10.1007/3-540-45744-5_45
DO - 10.1007/3-540-45744-5_45
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AN - SCOPUS:84867754522
SN - 3540422544
SN - 9783540422549
T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
SP - 529
EP - 544
BT - Automated Reasoning - First International Joint Conference, IJCAR 2001, Proceedings
A2 - Gore, Rajeev
A2 - Leitsch, Alexander
A2 - Nipkow, Tobias
PB - Springer Verlag
T2 - 1st International Joint Conference on Automated Reasoning, IJCAR 2001
Y2 - 18 June 2001 through 22 June 2001
ER -