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On Strictly Positive Fragments of Modal Logics with Confluence

Author

Listed:
  • Stanislav Kikot

    (Institute for Information Transmission Problems, 127051 Moscow, Russia)

  • Andrey Kudinov

    (Institute for Information Transmission Problems, 127051 Moscow, Russia
    Faculty of Mathematics, Joint Department with the Kharkevich Institute for Information Transmission Problems (RAS), HSE University, 101000 Moscow, Russia)

Abstract

We axiomatize strictly positive fragments of modal logics with the confluence axiom. We consider unimodal logics such as K . 2 , D . 2 , D 4 . 2 and S 4 . 2 with unimodal confluence ⋄ □ p → □ ⋄ p as well as the products of modal logics in the set K , D , T , D 4 , S 4 , which contain bimodal confluence ⋄ 1 □ 2 p → □ 2 ⋄ 1 p . We show that the impact of the unimodal confluence axiom on the axiomatisation of strictly positive fragments is rather weak. In the presence of ⊤ → ⋄ ⊤ , it simply disappears and does not contribute to the axiomatisation. Without ⊤ → ⋄ ⊤ it gives rise to a weaker formula ⋄ ⊤ → ⋄ ⋄ ⊤ . On the other hand, bimodal confluence gives rise to more complicated formulas such as ⋄ 1 p ∧ ⋄ 2 n ⊤ → ⋄ 1 ( p ∧ ⋄ 2 n ⊤ ) (which are superfluous in a product if the corresponding factor contains ⊤ → ⋄ ⊤ ). We also show that bimodal confluence cannot be captured by any finite set of strictly positive implications.

Suggested Citation

  • Stanislav Kikot & Andrey Kudinov, 2022. "On Strictly Positive Fragments of Modal Logics with Confluence," Mathematics, MDPI, vol. 10(19), pages 1-14, October.
  • Handle: RePEc:gam:jmathe:v:10:y:2022:i:19:p:3701-:d:937559
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