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  1. (1 other version)Deduction theorems for RM and its extensions.Marek Tokarz - 1979 - Studia Logica 38 (2):105 - 111.
    In this paper logics defined by finite Sugihara matrices, as well as RM itself, are discussed both in their matrix (semantical) and in syntactical version. For each such a logic a deduction theorem is proved, and a few applications are given.
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  • Four-valued expansions of Dunn-Belnap's logic (I): Basic characterizations.Alexej P. Pynko - 2020 - Bulletin of the Section of Logic 49 (4):401-437.
    Basic results of the paper are that any four-valued expansion L4 of Dunn-Belnap's logic DB4 is de_ned by a unique conjunctive matrix ℳ4 with exactly two distinguished values over an expansion.
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  • Revisiting Constructive Mingle: Algebraic and Operational Semantics.Yale Weiss - 2022 - In Katalin Bimbo (ed.), Essays in Honor of J. Michael Dunn. College Publications. pp. 435-455.
    Among Dunn’s many important contributions to relevance logic was his work on the system RM (R-mingle). Although RM is an interesting system in its own right, it is widely considered to be too strong. In this chapter, I revisit a closely related system, RM0 (sometimes known as ‘constructive mingle’), which includes the mingle axiom while not degenerating in the way that RM itself does. My main interest will be in examining this logic from two related semantical perspectives. First, I give (...)
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  • Fragments of R-Mingle.W. J. Blok & J. G. Raftery - 2004 - Studia Logica 78 (1-2):59-106.
    The logic RM and its basic fragments (always with implication) are considered here as entire consequence relations, rather than as sets of theorems. A new observation made here is that the disjunction of RM is definable in terms of its other positive propositional connectives, unlike that of R. The basic fragments of RM therefore fall naturally into two classes, according to whether disjunction is or is not definable. In the equivalent quasivariety semantics of these fragments, which consist of subreducts of (...)
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  • Many-place sequent calculi for finitely-valued logics.Alexej P. Pynko - 2010 - Logica Universalis 4 (1):41-66.
    In this paper, we study multiplicative extensions of propositional many-place sequent calculi for finitely-valued logics arising from those introduced in Sect. 5 of Pynko (J Multiple-Valued Logic Soft Comput 10:339–362, 2004) through their translation by means of singularity determinants for logics and restriction of the original many-place sequent language. Our generalized approach, first of all, covers, on a uniform formal basis, both the one developed in Sect. 5 of Pynko (J Multiple-Valued Logic Soft Comput 10:339–362, 2004) for singular finitely-valued logics (...)
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  • A Kripke-style semantics for R-Mingle using a binary accessibility relation.J. Michael Dunn - 1976 - Studia Logica 35 (2):163 - 172.
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  • On the lattice of quasivarieties of Sugihara algebras.W. J. Blok & W. Dziobiak - 1986 - Studia Logica 45 (3):275 - 280.
    Let S denote the variety of Sugihara algebras. We prove that the lattice (K) of subquasivarieties of a given quasivariety K S is finite if and only if K is generated by a finite set of finite algebras. This settles a conjecture by Tokarz [6]. We also show that the lattice (S) is not modular.
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  • Relevant Robinson's arithmetic.J. Michael Dunn - 1979 - Studia Logica 38 (4):407 - 418.
    In this paper two different formulations of Robinson's arithmetic based on relevant logic are examined. The formulation based on the natural numbers (including zero) is shown to collapse into classical Robinson's arithmetic, whereas the one based on the positive integers (excluding zero) is shown not to similarly collapse. Relations of these two formulations to R. K. Meyer's system R# of relevant Peano arithmetic are examined, and some remarks are made about the role of constant functions (e.g., multiplication by zero) in (...)
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  • The Weak Variable Sharing Property.Tore Fjetland Øgaard - 2023 - Bulletin of the Section of Logic (1):85-99.
    An algebraic type of structure is shown forth which is such that if it is a characteristic matrix for a logic, then that logic satisfies Meyer's weak variable sharing property. As a corollary, it is shown that RM and all its odd-valued extensions \(\mathbf{RM}_{2n\mathord{-}1}\) satisfy the weak variable sharing property. It is also shown that a proof to the effect that the "fuzzy" version of the relevant logic R satisfies the property is incorrect.
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  • (1 other version)Algebraic aspects of deduction theorems.Janusz Czelakowski - 1985 - Studia Logica 44 (4):369 - 387.
    The first known statements of the deduction theorems for the first-order predicate calculus and the classical sentential logic are due to Herbrand [8] and Tarski [14], respectively. The present paper contains an analysis of closure spaces associated with those sentential logics which admit various deduction theorems. For purely algebraic reasons it is convenient to view deduction theorems in a more general form: given a sentential logic C (identified with a structural consequence operation) in a sentential language I, a quite arbitrary (...)
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  • Functions definable in Sugihara algebras and their fragments.Marek Tokarz - 1975 - Studia Logica 34 (4):295-304.
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  • A Pretabular Classical Relevance Logic.Lisa Galminas & John G. Mersch - 2012 - Studia Logica 100 (6):1211-1221.
    In this paper we construct an extension, ℒ, of Anderson and Belnap's relevance logic R that is classical in the sense that it contains p&p → q as a theorem, and we prove that ℒ is pretabular in the sense that while it does not have a finite characteristic matrix, every proper normal extension of it does. We end the paper by commenting on the possibility of finding other classical relevance logics that are also pretabular.
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  • (1 other version)A strongly finite logic with infinite degree of maximality.Marek Tokarz - 1976 - Studia Logica 35 (4):447 - 451.
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  • (1 other version)The existence of matrices strongly adequate for e, R and their fragments.Marek Tokarz - 1979 - Studia Logica 38 (1):75 - 85.
    A logic is a pair (P,Q) where P is a set of formulas of a fixed propositional language and Q is a set of rules. A formula is deducible from X in the logic (P, Q) if it is deducible from XP via Q. A matrix is strongly adequate to (P, Q) if for any , X, is deducible from X iff for every valuation in , is designated whenever all the formulas in X are. It is proved in the (...)
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  • Minimal Sequent Calculi for Łukasiewicz’s Finitely-Valued Logics.Alexej P. Pynko - 2015 - Bulletin of the Section of Logic 44 (3/4):149-153.
    The primary objective of this paper, which is an addendum to the author’s [8], is to apply the general study of the latter to Łukasiewicz’s n-valued logics [4]. The paper provides an analytical expression of a 2(n−1)-place sequent calculus (in the sense of [10, 9]) with the cut-elimination property and a strong completeness with respect to the logic involved which is most compact among similar calculi in the sense of a complexity of systems of premises of introduction rules. This together (...)
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  • (1 other version)There are 2à0 logics with the relevance principle betweenr andRM.Wies?aw Dziobiak - 1983 - Studia Logica 42 (1):49-61.
    The aim of the paper is to prove the result announced by the title.
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