Stable canonical rules

R. Iemhoff, N. Bezhanishvili, Guram Bezhanishvili

Research output: Contribution to journalArticleAcademicpeer-review

Abstract

We introduce stable canonical rules and prove that each normal modal multi-conclusion consequence relation is axiomatizable by stable canonical rules. We apply these results to construct finite refutation patterns for modal formulas, and prove that each normal modal logic is axiomatizable by stable canonical rules. We also define stable multi-conclusion consequence relations and stable logics and prove that these systems have the finite model property. We conclude the paper with a number of examples of stable and non-stable systems, and show how to axiomatize them.
Original languageEnglish
Pages (from-to)284 - 315
JournalJournal of Symbolic Logic
Volume81
Issue number01
DOIs
Publication statusPublished - 2016

Keywords

  • Modal logic
  • multi-conclusion consequence relation
  • axiomatization
  • filtration
  • modal algebra
  • variety
  • universal class

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