Linear Abelian Modal Logic
Linear Abelian Modal Logic
Author(s): Hamzeh MohammadiSubject(s): Logic
Published by: Wydawnictwo Uniwersytetu Łódzkiego
Keywords: many-valued logic; modal logic; abelian logic; hypersequent calculus; cut-elimination
Summary/Abstract: A many-valued modal logic, called linear abelian modal logic \(\rm {\mathbf{LK(A)}}\) is introduced as an extension of the abelian modal logic \(\rm \mathbf{K(A)}\). Abelian modal logic \(\rm \mathbf{K(A)}\) is the minimal modal extension of the logic of lattice-ordered abelian groups. The logic \(\rm \mathbf{LK(A)}\) is axiomatized by extending \(\rm \mathbf{K(A)}\) with the modal axiom schemas \(\Box(\varphi\vee\psi)\rightarrow(\Box\varphi\vee\Box\psi)\) and \((\Box\varphi\wedge\Box\psi)\rightarrow\Box(\varphi\wedge\psi)\). Completeness theorem with respect to algebraic semantics and a hypersequent calculus admitting cut-elimination are established. Finally, the correspondence between hypersequent calculi and axiomatization is investigated.
Journal: Bulletin of the Section of Logic
- Issue Year: 53/2024
- Issue No: 1
- Page Range: 1-28
- Page Count: 28
- Language: English
