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Constructions
Philosophy of Science 53 (4):514-534 (1986)
Abstract
The paper deals with the semantics of mathematical notation. In arithmetic, for example, the syntactic shape of a formula represents a particular way of specifying, arriving at, or constructing an arithmetical object (that is, a number, a function, or a truth value). A general definition of this sense of "construction" is proposed and compared with related notions, in particular with Frege's concept of "function" and Carnap's concept of "intensional isomorphism." It is argued that constructions constitute the proper subject matter of both logic and mathematics, and that a coherent semantic account of mathematical formulas cannot be given without assuming that they serve as names of constructionsMy notes
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Citations of this work
Procedural Semantics for Hyperintensional Logic: Foundations and Applications of Transparent Intensional Logic.Marie Duží, Bjorn Jespersen & Pavel Materna - 2010 - Dordrecht, Netherland: Springer.
First among equals: co-hyperintensionality for structured propositions.Bjørn Jespersen - 2020 - Synthese 199 (1-2):4483-4497.
Why the tuple theory of structured propositions isn't a theory of structured propositions.Bjørn Jespersen - 2003 - Philosophia 31 (1-2):171-183.
References found in this work
Posthumous Writings.Gottlob Frege - 1982 - Revue Philosophique de la France Et de l'Etranger 172 (1):101-103.
Introduction to mathematical logic.Alonso Church - 1958 - Revue de Métaphysique et de Morale 63 (1):118-118.
Frege's theory of functions and objects.William Marshall - 1953 - Philosophical Review 62 (3):374-390.
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