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CADE
2001
Springer
2001
Springer
Canonical Propositional Gentzen-Type Systems
Canonical propositional Gentzen-type systems are systems which in addition to the standard axioms and structural rules have only pure logical rules with the subformula property, in which exactly one occurrence of a connective is introduced in the conclusion, and no other occurrence of any connective is mentioned anywhere else. In this paper we considerably generalize the notion of a "canonical system" to first-order languages and beyond. We extend the propositional coherence criterion for the non-triviality of such systems to rules with unary quantifiers and show that it remains constructive. Then we provide semantics for such canonical systems using 2-valued non-deterministic matrices extended to languages with quantifiers, and prove that the following properties are equivalent for a canonical system G: (1) G admits Cut-Elimination, (2) G is coherent, and (3) G has a characteristic 2-valued non-deterministic matrix.
Real-time Traffic2-valued Non-deterministic Matrices | Automated Reasoning | CADE 2001 | Propositional Coherence Criterion | Pure Logical Rules |
Related Content
| Added | 03 Dec 2009 |
| Updated | 03 Dec 2009 |
| Type | Conference |
| Year | 2001 |
| Where | CADE |
| Authors | Arnon Avron, Iddo Lev |
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