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Vom Zahlen zu den Zahlen: On the Relation Between Computation and Arithmetical Structuralism

Philosophia Mathematica 20 (3):275-288 (2012)

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Computational Structuralism &dagger.Volker Halbach & Leon Horsten - 2005 - Philosophia Mathematica 13 (2):174-186.details According to structuralism in philosophy of mathematics, arithmetic is about a single structure. First-order theories are satisfied by models that do not instantiate this structure. Proponents of structuralism have put forward various accounts of how we succeed in fixing one single structure as the intended interpretation of our arithmetical language. We shall look at a proposal that involves Tennenbaum's theorem, which says that any model with addition and multiplication as recursive operations is isomorphic to the standard model of arithmetic. On (...) Mathematical Structuralism in Philosophy of Mathematics Direct download (9 more) Export citation Bookmark 21 citations
Computability and recursion.Robert I. Soare - 1996 - Bulletin of Symbolic Logic 2 (3):284-321.details We consider the informal concept of "computability" or "effective calculability" and two of the formalisms commonly used to define it, "(Turing) computability" and "(general) recursiveness". We consider their origin, exact technical definition, concepts, history, general English meanings, how they became fixed in their present roles, how they were first and are now used, their impact on nonspecialists, how their use will affect the future content of the subject of computability theory, and its connection to other related areas. After a careful (...) Computability in Philosophy of Computing and Information Logic and Philosophy of Logic Direct download (9 more) Export citation Bookmark 51 citations
Foundations without foundationalism: a case for second-order logic.Stewart Shapiro - 1991 - New York: Oxford University Press.details The central contention of this book is that second-order logic has a central role to play in laying the foundations of mathematics. In order to develop the argument fully, the author presents a detailed description of higher-order logic, including a comprehensive discussion of its semantics. He goes on to demonstrate the prevalence of second-order concepts in mathematics and the extent to which mathematical ideas can be formulated in higher-order logic. He also shows how first-order languages are often insufficient to codify (...) Epistemology of Logic in Logic and Philosophy of Logic Epistemology of Mathematics, Misc in Philosophy of Mathematics Logical Consequence and Entailment in Logic and Philosophy of Logic Philosophy of Mathematics, Misc in Philosophy of Mathematics Second-Order Logic in Logic and Philosophy of Logic Theories of Mathematics, Misc in Philosophy of Mathematics $38.00 used $55.70 new $63.02 from Amazon View on Amazon.com Direct download (5 more) Export citation Bookmark 226 citations
Models and reality.Hilary Putnam - 1980 - Journal of Symbolic Logic 45 (3):464-482.details Internal Realism in Metaphysics Logic and Philosophy of Logic The Model-Theoretic Argument in Metaphysics The Nature of Models in General Philosophy of Science Direct download (8 more) Export citation Bookmark 283 citations
How we learn mathematical language.Vann McGee - 1997 - Philosophical Review 106 (1):35-68.details Mathematical realism is the doctrine that mathematical objects really exist, that mathematical statements are either determinately true or determinately false, and that the accepted mathematical axioms are predominantly true. A realist understanding of set theory has it that when the sentences of the language of set theory are understood in their standard meaning, each sentence has a determinate truth value, so that there is a fact of the matter whether the cardinality of the continuum is א2 or whether there are (...) Austrian Philosophy in European Philosophy British Philosophy in European Philosophy Direct download (7 more) Export citation Bookmark 98 citations
Plural quantification exposed.Øystein Linnebo - 2003 - Noûs 37 (1):71–92.details This paper criticizes George Boolos's famous use of plural quantification to argue that monadic second-order logic is pure logic. I deny that plural quantification qualifies as pure logic and express serious misgivings about its alleged ontological innocence. My argument is based on an examination of what is involved in our understanding of the impredicative plural comprehension schema. Plural Quantification in Philosophy of Language Second-Order Logic in Logic and Philosophy of Logic The Nature of Sets, Misc in Philosophy of Mathematics Direct download (4 more) Export citation Bookmark 70 citations
Wittgenstein on rules and private language: an elementary exposition.Saul A. Kripke - 1982 - Cambridge, Mass.: Harvard University Press.details In this book Saul Kripke brings his powerful philosophical intelligence to bear on Wittgenstein's analysis of the notion of following a rule. Kripkenstein on Meaning in Philosophy of Language Ludwig Wittgenstein in 20th Century Philosophy Private Language in Philosophy of Language $6.61 used $29.34 new $31.50 from Amazon View on Amazon.com Direct download (5 more) Export citation Bookmark 753 citations
Logicism and the ontological commitments of arithmetic.Harold T. Hodes - 1984 - Journal of Philosophy 81 (3):123-149.details Logicism in Mathematics in Philosophy of Mathematics Numbers in Philosophy of Mathematics Philosophy of Language Direct download (6 more) Export citation Bookmark 119 citations
Recantation or any old w-sequence would do after all.Paul Benacerraf - 1996 - Philosophia Mathematica 4 (2):184-189.details What Numbers Could Not Be’) that an adequate account of the numbers and our arithmetic practice must satisfy not only the conditions usually recognized to be necessary: (a) identify some w-sequence as the numbers, and (b) correctly characterize the cardinality relation that relates a set to a member of that sequence as its cardinal number—it must also satisfy a third condition: the ‘<’ of the sequence must be recursive. This paper argues that adding this further condition was a mistake—any w-sequence (...) Mathematical Structuralism in Philosophy of Mathematics Direct download (10 more) Export citation Bookmark 15 citations
How We Learn Mathematical Language.Vann McGee - 1997 - Philosophical Review 106 (1):35-68.details Mathematical realism is the doctrine that mathematical objects really exist, that mathematical statements are either determinately true or determinately false, and that the accepted mathematical axioms are predominantly true. A realist understanding of set theory has it that when the sentences of the language of set theory are understood in their standard meaning, each sentence has a determinate truth value, so that there is a fact of the matter whether the cardinality of the continuum is א2 or whether there are (...) No categories Direct download (3 more) Export citation Bookmark 66 citations
To be is to be a value of a variable (or to be some values of some variables).George Boolos - 1984 - Journal of Philosophy 81 (8):430-449.details Plural Quantification in Philosophy of Language Direct download (4 more) Export citation Bookmark 275 citations
Discrete transfinite computation models.Philip D. Welch - 2011 - In S. B. Cooper & Andrea Sorbi (eds.), Computability in Context: Computation and Logic in the Real World. World Scientific. pp. 375--414.details Computationalism in Philosophy of Cognitive Science Direct download Export citation Bookmark 3 citations
Wittgenstein on Rules and Private Language. An Elementary Exposition.Saul A. Kripke - 1983 - Philosophical Quarterly 33 (133):398-404.details No categories Export citation Bookmark 138 citations

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