Título | Maximality in finite-valued Łukasiewicz logics defined by order filters |

Publication Type | Journal Article |

Year of Publication | 2019 |

Authors | Coniglio M [1], Esteva F [2], Gispert J [3], Godo L [4] |

Journal | Journal of Logic and Computation |

Volume | 29 |

Incidencia | 1 |

Paginación | 125-156 |

Editorial | OUP |

Resumen | In this paper we consider the logics $\mathsf{L}_n^i$ obtained from the $(n+1)$-valued {\L}ukasiewicz logics {\L}$_{n+1}$ by taking the order filter generated by $i/n$ as the set of designated elements. In particular, the conditions of maximality and strong maximality among them are analyzed. We present a very general theorem which provides sufficient conditions for maximality between logics. As a consequence of this theorem it is shown that $\mathsf{L}_n^i$ is maximal w.r.t.\ {\sf CPL} whenever $n$ is prime. Concerning strong maximality (that is, maximality w.r.t. rules instead of only axioms), we provide algebraic arguments in order to show that the logics $\mathsf{L}_n^i$ are not strongly maximal w.r.t.\ {\sf CPL}, even for $n$ prime. Indeed, in such case, we show there is just one extension between $\mathsf{L}_n^i$ and {\sf CPL} obtained by adding to $\mathsf{L}_n^i$ a kind of graded explosion rule. Finally, using these results, we show that the logics $\mathsf{L}_n^i$ with $n$ prime and $i/n < 1/2$ are ideal paraconsistent logics. |

URL | https://doi.org/10.1093/logcom/exy032 [5] |

DOI | 10.1093/logcom/exy032 [6] |