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On Leśniewski's Elementary Ontology

In Jan T. J. Srzednicki, V. F. Rickey & J. Czelakowski (eds.), Leśniewski's systems. Hingham, MA, USA: Distributors for the United States and Canada, Kluwer Boston. pp. 165--215 (1984)

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  1. The Pioneering Proving Methods as Applied in the Warsaw School of Logic – Their Historical and Contemporary Significance.Urszula Wybraniec-Skardowska - 2024 - History and Philosophy of Logic 45 (2):124-141.
    Justification of theorems plays a vital role in any rational human activity. It is indispensable in science. The deductive method of justifying theorems is used in all sciences and it is the only method of justifying theorems in deductive disciplines. It is based on the notion of proof, thus it is a method of proving theorems. In the Warsaw School of Logic (WSL) – the famous branch of the Lvov-Warsaw School (LWS) – two types of the method: axiomatic deduction method (...)
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  • (2 other versions)Rejection in Łukasiewicz's and Słupecki' Sense.Urszula Wybraniec-Skardowska - 2018 - Lvov-Warsaw School. Past and Present.
    The idea of rejection originated by Aristotle. The notion of rejection was introduced into formal logic by Łukasiewicz [20]. He applied it to complete syntactic characterization of deductive systems using an axiomatic method of rejection of propositions [22, 23]. The paper gives not only genesis, but also development and generalization of the notion of rejection. It also emphasizes the methodological approach to biaspectual axiomatic method of characterization of deductive systems as acceptance (asserted) systems and rejection (refutation) systems, introduced by Łukasiewicz (...)
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  • (2 other versions)Rejection in Łukasiewicz's and Słupecki's Sense.Urszula Wybraniec-Skardowska - 2018 - In Urszula Wybraniec-Skardowska & Ángel Garrido (eds.), The Lvov-Warsaw School. Past and Present. Cham, Switzerland: Springer- Birkhauser,. pp. 575-597.
    The idea of rejection originated by Aristotle. The notion of rejection was introduced into formal logic by Łukasiewicz [20]. He applied it to complete syntactic characterization of deductive systems using an axiomatic method of rejection of propositions [22, 23]. The paper gives not only genesis, but also development and generalization of the notion of rejection. It also emphasizes the methodological approach to biaspectual axiomatic method of characterization of deductive systems as acceptance (asserted) systems and rejection (refutation) systems, introduced by Łukasiewicz (...)
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  • Leśniewski's Systems of Logic and Foundations of Mathematics.Rafal Urbaniak - 2013 - Cham, Switzerland: Springer.
    With material on his early philosophical views, his contributions to set theory and his work on nominalism and higher-order quantification, this book offers a uniquely expansive critical commentary on one of analytical philosophy’s great ...
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  • A semantical investigation into leśniewski's axiom of his ontology.Mitio Takano - 1985 - Studia Logica 44 (1):71 - 77.
    A structure A for the language L, which is the first-order language (without equality) whose only nonlogical symbol is the binary predicate symbol , is called a quasi -struoture iff (a) the universe A of A consists of sets and (b) a b is true in A ([p) a = {p } & p b] for every a and b in A, where a(b) is the name of a (b). A quasi -structure A is called an -structure iff (c) {p (...)
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  • Embedding the elementary ontology of stanisław leśniewski into the monadic second-order calculus of predicates.V. A. Smirnov - 1983 - Studia Logica 42 (2-3):197 - 207.
    LetEO be the elementary ontology of Leniewski formalized as in Iwanu [1], and letLS be the monadic second-order calculus of predicates. In this paper we give an example of a recursive function , defined on the formulas of the language ofEO with values in the set of formulas of the language of LS, such that EO A iff LS (A) for each formulaA.
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  • Embeddings between the elementary ontology with an atom and the monadic second-order predicate logic.Mitio Takano - 1987 - Studia Logica 46 (3):247 - 253.
    Let EOA be the elementary ontology augmented by an additional axiom S (S S), and let LS be the monadic second-order predicate logic. We show that the mapping which was introduced by V. A. Smirnov is an embedding of EOA into LS. We also give an embedding of LS into EOA.
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  • A survey of Leśniewski's logic.V. Frederick Rickey - 1977 - Studia Logica 36 (4):407-426.
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  • A leśniewskian guide to Husserl's and meinong's jungles.Vladimir L. Vasyukov - 1993 - Axiomathes 4 (1):59-74.
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