Abstract
We discuss Smirnov’s problem of finding a common background for classifying implicational logics. We formulate and solve the problem of extending, in an appropriate way, an implicational fragment H → of the intuitionistic propositional logic to an implicational fragment TV → of the classical propositional logic. As a result we obtain logical constructions having the form of Boolean lattices whose elements are implicational logics. In this way, whole classes of new logics can be obtained. We also consider the transition from implicational logics to full logics. On the base of the lattices constructed, we formulate the main classification principles for propositional logics.
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References
Anderson, A. R., and N. D. Belnap jr., Entailment: The logic of relevance and necessity, Vol. 1, Princeton, 1975.
Anderson, A. R., and N. D. Belnap jr., ‘The pure calculus of entailment’, The Journal of Symbolic Logic 27 (1962), 19-52.
Avron, A., ‘Relevant entailment — semantics and formal system’, The Journal of Symbolic Logic 49 (1984), 334-342.
Belnap jr., N. D., ‘Display logic’, Journal of Philosophical Logic 11 (1982), 375-417.
Chang, C. C., ‘A new proof of the completeness of the Łukasiewicz axioms’, Transactions of the American Mathematical Society 93 (1959), 74-80.
Church, A., ‘The weak theory of implication’, in Kontrolliertes Denken, Untersuchungen zum Logikkalkül und der Logik der Einzelwissenschaften, A. Menne et al. (ed.), Munich, 1951, pp. 22-37. (Abstract: ‘The weak positive implicational propositional calculus’, The Journal of Symbolic Logic 16 (1951), p. 238.)
Curry, H. B., ‘Generalisation of the deduction theorem’, Proceedings of the International Congress of Mathematicians 2 (1954), Amsterdam, pp. 399-400.
Curry, H. B., and R. Feys, Combinatory Logic, Vol. 1, Amsterdam, 1958.
DoŠen, K., ‘Sequent-systems and groupoid models I’, Studia Logica 47 (1988), 353-385.
DoŠen, K., ‘Sequent-systems and groupoid models II’, Studia Logica 48 (1989), 41-65.
DoŠen, K., and P. Schroeder-Heister (eds.), Substructural Logics, Oxford, 1993.
Dyrda, K., ‘On classification of commutative BCK-logics’, Bulletin of the Section of Logic 14 (1985), 30-33.
Gabbay, D. V., and R. J. G. B. De Queiroz, ‘Extending the Curry-Howard interpretation to linear, relevant and other resource logics’, The Journal of Symbolic Logic 57 (1992), 1319-1365.
Hacking, I., ‘What is strict implication?’, The Journal of Symbolic Logic 28 (1963), 51-71.
Heyting, A., ‘Die formalen Regeln der intuitionistischen Logik’, Sitzungsberichte der Preussischen Academie der Wissenschaften zu Berlin, Berlin, 1930, pp. 42-56.
Karpenko, A. S., ‘Lattices of implicational logics’, Bulletin of the Section of Logic 21 (1992), 82-91.
Karpenko, A. S., ‘Construction of classical propositional logic’, Bulletin of the Section of Logic 22 (1993), 92-97.
Karpenko, A. S., ‘Implicational logics: lattices and construction’, Logical Investigations 2 (1993), Moscow, pp. 224-258 (in Russian).
Karpenko, A. S., Many-Valued Logics (monograph), Logic and Computer, Vol. 4, Moscow, 1997, (in Russian).
Karpenko, A. S., ‘A maximal lattice of implicational logics’, Bulletin of the Section of Logic 27 (1992), 29-32.
Karpenko, A. S., and S. A. Pavlov, ‘Matrices for independence of the transitivity axiom in the axiomatization of classical implication’, in Proceedings of the Research Seminar in Logic of Institute of Philosophy, Russian Academy of Sciences, 1993, Moscow, 1994, pp. 107-109 (in Russian).
Karpenko, A. S., and V. M. Popov, ‘BCKX is the axiomatization of the implicational fragment of Łukasiewicz’s infinite-valued logic Łω’, Bulletin of the Section of Logic 26 (1997), 112-117.
Kashima, R, and N. Kamide, ‘Substructural implicational logics including the relevant logic E’, Studia Logica 63 (1999), 181-212.
Lemmon, E. J., C. A. Meredith, D. Meredith, A. N. Prior, I. Thomas, ‘Calculi of pure strict implication’, in Philosophical Logic, Dordrecht, 1969, pp. 215-250.
Łukasiewicz, J., ‘O logice trójwartościowej’, Ruch Filozoficzny 5 (1920), 170-171. (English translation: J. Łukasiewicz, ‘On three-valued logic’, in Selected Works, Warszawa, 1970, pp. 87–88.)
Łukasiewicz, J., Elementy logiki matematycznej, Warszawa, 1929. (English translation: Elements of Mathematical Logic, N.Y., 1963.)
Łukasiewicz, J., and A. Tarski, ‘Untersuchungen über den Aussagenkalkül’, Comptes rendus de la Societé des Sciences et des Lettres de Varsovie 23 (1930), 1-21. (English translation: J. Łukasiewicz and A. Tarski, ‘Investigations into the sentential calculus’, Selected Works, Warszawa, 1970, pp. 131–152.)
Mendez, J. M., ‘Exhaustively axiomatizing S3→ and S4→ with a select list of representative theses’, Bulletin of the Section of Logic 17 (1988), 15-22.
Meyer, R. K., ‘Pure denumerable Łukasiewicz implication’, The Journal of Symbolic Logic 31 (1966), 575-580.
Meyer, R. K., and Z. Parks, ‘Independent axioms for the implicational fragment of Sobociński’s three-valued logic’, Zeitschrift für mathematische Logik und Grundlagen der Mathematik 18 (1972), 291-295.
Ono, H., ‘Structural rules and a logical hierarchy’, Mathematical Logic, N.Y., 1990, 95-104.
Pahi, B., ‘Full models and restricted extensions of propositional calculi’, Zeitschrift für mathematische Logic und Grundlagen der Mathematik 17 (1971), 5-10.
Prior, A. N., Formal Logic, Oxford, 1962.
Rasiowa, H., An Algebraic Approach to Non-Classical Logics, Amsterdam, 1974.
Rose, A., ‘Formalization du calcul propositional implicatif à ℵo-valeurs de Łukasiewicz’, Comptes rendus hebdomadaires des séances de l’Academie des Sciences 243 (1956), 1183-1185.
Rose, A., ‘Formalization du calcul propositionel implicatif à m-valeurs de Łukasiewicz’, Comptes rendus hebdomadaires des séances de l’Academie des Sciences 243 (1956), 1263-1264.
Rose, A., and J. B. Rosser, ‘Fragments of many-valued statement calculi’, Transaction of the American Mathematical Society 87 (1958), 1-53.
SchÖnfinkel, ‘Über die Bausteine der mathematischen Logik’, Mathematischen Annalen 92 (1924), 305-316. (English translation: From Frege to Gödel: a source-book in mathematical logic, J. van Heijenoort (ed.), Cambridge, 1967, pp. 355–366.)
Slaney, J. K., and M. V. Bunder, ‘Classical versions of BCI, BCK and BCIW logic’, Bulletin of the Section of Logic 23 (1994), 61-65.
Smirnov, V. A., Formal Inference and Logical Calculi, Moscow, 1972 (in Russian).
Smirnov, V. A., ‘Formal inference, deduction theorems and theories of implication’, Logical Inference, Moscow, 1979, pp. 54-68 (in Russian).
SobociŃski, B., ‘Axiomatization of a partial system of three-valued calculus of propositions’, The Journal of Computing Systems 1 (1952), 23-55.
Tanaka, S., ‘On axiom systems of propositional calculi’, Proceedings of the Japanese Academy 43 (1967), 192-193.
Tarski, A., ‘Über die Erweiterungen der unvollständigen Systeme des Aussagenkalküls’, Ergebnisse cines mathematischen Kolloquiums 7 (1934–5), 51-57. (English translation: ‘On extensions of incomplete systems of the sentential calculus’, in A. Tarski, Logic, Semantics, Metamathematics. Papers from 1923 to 1938, Oxford, 1956, pp. 393–400.)
Turquette, A. R., ‘Independent axioms for infinite-valued logic’, The Journal of Symbolic Logic 28 (1963), 217-221.
Turquette, A. R., ‘A method for constructing implication logics’, Zeitschrift für mathematische Logik und Grundlagen der Mathematik 12 (1966), 267-278.
Tuziak, R., ‘An axiomatization of the finite-valued Łukasiewicz calculus’, Studia Logica 47 (1988), 49-55.
Ulrich, D., ‘An integer-valued matrix characteristic for implicational S5’, Bulletin of the Section of Logic 19 (1990), 87-91.
Ulrich, D., ‘On the independence of B from I, C, W, K ′1 , and Karpenko's formula X', Bulletin of the Section of Logic 23 (1994), 96-97.
Wajsberg, M., ‘Metalogische Beiträge’, Wiadomości Matematyczne 43 (1937), 131-168. (English translation: ‘Contributions to metalogic’, in M. Wajsberg, Logical Works, Wrocław, 1977, pp. 172–200.)
Wansing, H., ‘Formulas-as-types for a hierarchy of sublogics of intuitionistic propositional logic’, 1990, Bericht Nr. 9, Berlin (preprint).
WoŹniakowska, B., ‘Algebraic proof of the separation theorem for the infinite-valued logic of Łukasiewicz’, Reports on Mathematical Logic 10 (1978), 129-137.
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Karpenko, A.S. The Classification of Propositional Calculi. Studia Logica 66, 253–271 (2000). https://doi.org/10.1023/A:1005292130553
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DOI: https://doi.org/10.1023/A:1005292130553