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Unification in modal logic Alt1

In Lev Beklemishev, Stéphane Demri & András Máté (eds.), Advances in Modal Logic, Volume 11. CSLI Publications. pp. 117-134 (2016)

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  1. Remarks about the unification type of several non-symmetric non-transitive modal logics.Philippe Balbiani - 2019 - Logic Journal of the IGPL 27 (5):639-658.
    The problem of unification in a normal modal logic $L$ can be defined as follows: given a formula $\varphi$, determine whether there exists a substitution $\sigma$ such that $\sigma $ is in $L$. In this paper, we prove that for several non-symmetric non-transitive modal logics, there exists unifiable formulas that possess no minimal complete set of unifiers.
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  • Remarks about the unification types of some locally tabular normal modal logics.Philippe Balbiani, ÇiĞdem Gencer, Maryam Rostamigiv & Tinko Tinchev - 2023 - Logic Journal of the IGPL 31 (1):115-139.
    It is already known that unifiable formulas in normal modal logic |$\textbf {K}+\square ^{2}\bot $| are either finitary or unitary and unifiable formulas in normal modal logic |$\textbf {Alt}_{1}+\square ^{2}\bot $| are unitary. In this paper, we prove that for all |$d{\geq }3$|⁠, unifiable formulas in normal modal logic |$\textbf {K}+\square ^{d}\bot $| are either finitary or unitary and unifiable formulas in normal modal logic |$\textbf {Alt}_{1}+\square ^{d}\bot $| are unitary.
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  • Unification types in Euclidean modal logics.Majid Alizadeh, Mohammad Ardeshir, Philippe Balbiani & Mojtaba Mojtahedi - 2023 - Logic Journal of the IGPL 31 (3):422-440.
    We prove that $\textbf {K}5$ and some of its extensions that do not contain $\textbf {K}4$ are of unification type $1$.
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