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Wittgenstein's Philosophy of Mathematics

Mind 108 (429):159-162 (1994)

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  1. Wittgenstein on Pseudo-Irrationals, Diagonal Numbers and Decidability.Timm Lampert - 2008 - In Lampert Timm (ed.), The Logica Yearbook 2008. pp. 95-111.
    In his early philosophy as well as in his middle period, Wittgenstein holds a purely syntactic view of logic and mathematics. However, his syntactic foundation of logic and mathematics is opposed to the axiomatic approach of modern mathematical logic. The object of Wittgenstein’s approach is not the representation of mathematical properties within a logical axiomatic system, but their representation by a symbolism that identifies the properties in question by its syntactic features. It rests on his distinction of descriptions and operations; (...)
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  • Philosophical pictures about mathematics: Wittgenstein and contradiction.Hiroshi Ohtani - 2018 - Synthese 195 (5):2039-2063.
    In the scholarship on Wittgenstein’s later philosophy of mathematics, the dominant interpretation is a theoretical one that ascribes to Wittgenstein some type of ‘ism’ such as radical verificationism or anti-realism. Essentially, he is supposed to provide a positive account of our mathematical practice based on some basic assertions. However, I claim that he should not be read in terms of any ‘ism’ but instead should be read as examining philosophical pictures in the sense of unclear conceptions. The contrast here is (...)
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  • Wittgenstein on Mathematical Identities.André Porto - 2012 - Disputatio 4 (34):755-805.
    This paper offers a new interpretation for Wittgenstein`s treatment of mathematical identities. As it is widely known, Wittgenstein`s mature philosophy of mathematics includes a general rejection of abstract objects. On the other hand, the traditional interpretation of mathematical identities involves precisely the idea of a single abstract object – usually a number –named by both sides of an equation.
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  • Wittgenstein’s Philosophy of Arithmetic.Marc A. Joseph - 1998 - Dialogue 37 (1):83-.
    It is argued that the finitist interpretation of wittgenstein fails to take seriously his claim that philosophy is a descriptive activity. Wittgenstein's concentration on relatively simple mathematical examples is not to be explained in terms of finitism, But rather in terms of the fact that with them the central philosophical task of a clear 'ubersicht' of its subject matter is more tractable than with more complex mathematics. Other aspects of wittgenstein's philosophy of mathematics are touched on: his view that mathematical (...)
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  • Kripke's account of the rule‐following considerations.Andrea Guardo - 2012 - European Journal of Philosophy 20 (3):366-388.
    This paper argues that most of the alleged straight solutions to the sceptical paradox which Kripke ascribed to Wittgenstein can be regarded as the first horn of a dilemma whose second horn is the paradox itself. The dilemma is proved to be a by‐product of a foundationalist assumption on the notion of justification, as applied to linguistic behaviour. It is maintained that the assumption is unnecessary and that the dilemma is therefore spurious. To this end, an alternative conception of the (...)
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  • Tractatus 6 Reconsidered: An Algorithmic Alternative to Wittgenstein's Trade-Off.A. Roman & J. Gomułka - 2023 - History and Philosophy of Logic 45 (3):323-340.
    Wittgenstein's conception of the general form of a truth function given in thesis 6 can be presented as a sort of a trade-off: the author of the Tractatus is unable to reconcile the simplicity of his original idea of a series of forms with the simplicity of his generalisation of Sheffer's stroke; therefore, he is forced to sacrifice one of them. As we argue in this paper, the choice he makes – to weaken the logical constraints put on the concept (...)
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  • (1 other version)The Significance of Evidence-based Reasoning for Mathematics, Mathematics Education, Philosophy and the Natural Sciences.Bhupinder Singh Anand - forthcoming
    In this multi-disciplinary investigation we show how an evidence-based perspective of quantification---in terms of algorithmic verifiability and algorithmic computability---admits evidence-based definitions of well-definedness and effective computability, which yield two unarguably constructive interpretations of the first-order Peano Arithmetic PA---over the structure N of the natural numbers---that are complementary, not contradictory. The first yields the weak, standard, interpretation of PA over N, which is well-defined with respect to assignments of algorithmically verifiable Tarskian truth values to the formulas of PA under the interpretation. (...)
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  • Proofs Versus Experiments: Wittgensteinian Themes Surrounding the Four-Color Theorem.G. D. Secco - 2017 - In Marcos Silva (ed.), How Colours Matter to Philosophy. Cham: Springer. pp. 289-307.
    The Four-Colour Theorem (4CT) proof, presented to the mathematical community in a pair of papers by Appel and Haken in the late 1970's, provoked a series of philosophical debates. Many conceptual points of these disputes still require some elucidation. After a brief presentation of the main ideas of Appel and Haken’s procedure for the proof and a reconstruction of Thomas Tymoczko’s argument for the novelty of 4CT’s proof, we shall formulate some questions regarding the connections between the points raised by (...)
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  • From Pictures to Employments: Later Wittgenstein on 'the Infinite'.Philip Bold - forthcoming - Inquiry: An Interdisciplinary Journal of Philosophy.
    With respect to the metaphysics of infinity, the tendency of standard debates is to either endorse or to deny the reality of ‘the infinite’. But how should we understand the notion of ‘reality’ employed in stating these options? Wittgenstein’s critical strategy shows that the notion is grounded in a confusion: talk of infinity naturally takes hold of one’s imagination due to the sway of verbal pictures and analogies suggested by our words. This is the source of various philosophical pictures that (...)
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  • Wittgenstein on Formulae.Esther Ramharter - 2014 - Grazer Philosophische Studien 89 (1):79-91.
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  • Wittgenstein and Brouwer.Mathieu Marion - 2003 - Synthese 137 (1-2):103 - 127.
    In this paper, I present a summary of the philosophical relationship betweenWittgenstein and Brouwer, taking as my point of departure Brouwer's lecture onMarch 10, 1928 in Vienna. I argue that Wittgenstein having at that stage not doneserious philosophical work for years, if one is to understand the impact of thatlecture on him, it is better to compare its content with the remarks on logics andmathematics in the Tractactus. I thus show that Wittgenstein's position, in theTractactus, was already quite close to (...)
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  • Surveyability and Mathematical Certainty.Kai Michael Büttner - 2017 - Axiomathes 27 (1):113-128.
    The paper provides an interpretation of Wittgenstein’s claim that a mathematical proof must be surveyable. It will be argued that this claim specifies a precondition for the applicability of the word ‘proof’. Accordingly, the latter is applicable to a proof-pattern only if we can come to agree by mere observation whether or not the pattern possesses the relevant structural features. The claim is problematic. It does not imply any questionable finitist doctrine. But it cannot be said to articulate a feature (...)
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  • Is Wittgenstein a Contextualist?Alberto Voltolini - 2010 - Essays in Philosophy 11 (2):150-167.
    There is definitely a family resemblance between what contemporary contextualism maintains in philosophy of language and some of the claims about meaning put forward by the later Wittgenstein. Yet the main contextualist thesis, namely that linguistic meaning undermines truth-conditions, was not defended by Wittgenstein. If a claim in this regard can be retrieved in Wittgenstein despite his manifest antitheoretical attitude, it is instead that truth-conditions trivially supervene on linguistic meaning. There is, however, another Wittgensteinian claim that truly has a contextualist (...)
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  • Operations and Truth‐Operations in the Tractatus.João Vergílio Gallerani Cuter - 2005 - Philosophical Investigations 28 (1):63-75.
    Formal series are associated with ascriptions of numbers. They are ordered by formal operations that, unlike negation and disjunction, are not truth-operations. In spite of this, they are required to build propositions involving generic reference to numbers, and are essential to the Tractarian version of the logicist project.
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  • Wittgenstein on the Infinity of Primes.Timm Lampert∗ - 2008 - History and Philosophy of Logic 29 (1):63-81.
    It is controversial whether Wittgenstein's philosophy of mathematics is of critical importance for mathematical proofs, or is only concerned with the adequate philosophical interpretation of mathematics. Wittgenstein's remarks on the infinity of prime numbers provide a helpful example which will be used to clarify this question. His antiplatonistic view of mathematics contradicts the widespread understanding of proofs as logical derivations from a set of axioms or assumptions. Wittgenstein's critique of traditional proofs of the infinity of prime numbers, specifically those of (...)
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  • Wittgenstein on Circularity in the Frege-Russell Definition of Cardinal Number.Boudewijn de Bruin - 2008 - Philosophia Mathematica 16 (3):354-373.
    Several scholars have argued that Wittgenstein held the view that the notion of number is presupposed by the notion of one-one correlation, and that therefore Hume's principle is not a sound basis for a definition of number. I offer a new interpretation of the relevant fragments on philosophy of mathematics from Wittgenstein's Nachlass, showing that if different uses of ‘presupposition’ are understood in terms of de re and de dicto knowledge, Wittgenstein's argument against the Frege-Russell definition of number turns out (...)
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  • The Logical Analysis of Colour Statements in Wittgenstein’s Tractatus.Bradford F. Blue - 2021 - Philosophical Investigations 45 (2):107-129.
    Philosophical Investigations, Volume 45, Issue 2, Page 107-129, April 2022.
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  • Tractarian Logicism: Operations, Numbers, Induction.Gregory Landini - 2021 - Review of Symbolic Logic 14 (4):973-1010.
    In his Tractatus, Wittgenstein maintained that arithmetic consists of equations arrived at by the practice of calculating outcomes of operations$\Omega ^{n}(\bar {\xi })$defined with the help of numeral exponents. Since$Num$(x) and quantification over numbers seem ill-formed, Ramsey wrote that the approach is faced with “insuperable difficulties.” This paper takes Wittgenstein to have assumed that his audience would have an understanding of the implicit general rules governing his operations. By employing the Tractarian logicist interpretation that theN-operator$N(\bar {\xi })$and recursively defined arithmetic (...)
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  • (1 other version)Motivating Wittgenstein's Perspective on Mathematical Sentences as Norms.Simon Friederich - 2011 - Philosophia Mathematica 19 (1):1-19.
    The later Wittgenstein’s perspective on mathematical sentences as norms is motivated for sentences belonging to Hilbertian axiomatic systems where the axioms are treated as implicit definitions. It is shown that in this approach the axioms are employed as norms in that they function as standards of what counts as using the concepts involved. This normative dimension of their mode of use, it is argued, is inherited by the theorems derived from them. Having been motivated along these lines, Wittgenstein’s perspective on (...)
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  • La historia y la gramática de la recursión: una precisión desde la obra de Wittgenstein.Sergio Mota - 2014 - Pensamiento y Cultura 17 (1):20-48.
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  • The Hidden Set-Theoretical Paradox of the Tractatus.Jing Li - 2018 - Philosophia 46 (1):159-164.
    We are familiar with various set-theoretical paradoxes such as Cantor's paradox, Burali-Forti's paradox, Russell's paradox, Russell-Myhill paradox and Kaplan's paradox. In fact, there is another new possible set-theoretical paradox hiding itself in Wittgenstein’s Tractatus. From the Tractatus’s Picture theory of language we can strictly infer the two contradictory propositions simultaneously: the world and the language are equinumerous; the world and the language are not equinumerous. I call this antinomy the world-language paradox. Based on a rigorous analysis of the Tractatus, with (...)
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  • Gödel's and Other Paradoxes.Hartley Slater - 2015 - Philosophical Investigations 39 (4):353-361.
    Francesco Berto has recently written “The Gödel Paradox and Wittgenstein's Reasons,” about a paradox first formulated by Graham Priest in 1971. The major reason for disagreeing with Berto's conclusions concerns his elucidation of Wittgenstein's understanding of Gödel's theorems. Seemingly, Wittgenstein was some kind of proto-paraconsistentist. Priest himself has also, though in a different way, tried to tar Wittgenstein with the same brush. But the resolution of other paradoxes is intimately linked with the resolution of the Gödel Paradox, and with understanding (...)
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  • Wittgenstein's Critique of Set Theory.Victor Rodych - 2000 - Southern Journal of Philosophy 38 (2):281-319.
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