Empiricism, conservativeness, and quasi-truth

Philosophy of Science 66 (3):485 (1999)
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Abstract

A first step is taken towards articulating a constructive empiricist philosophy of mathematics, thus extending van Fraassen's account to this domain. In order to do so, I adapt Field's nominalization program, making it compatible with an empiricist stance. Two changes are introduced: (a) Instead of taking conservativeness as the norm of mathematics, the empiricist countenances the weaker notion of quasi-truth (as formulated by da Costa and French), from which the formal properties of conservativeness are derived; (b) Instead of quantifying over spacetime regions, the empiricist only admits quantification over occupied regions, since this is enough for his or her needs

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10.1086/392746

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Otávio Bueno
University of Miami

Citations of this work

Structure: Its shadow and substance.Bas C. van Fraassen - 2006 - British Journal for the Philosophy of Science 57 (2):275-307.
Logic in reality.Joseph E. Brenner - 2008 - Dordrecht: Springer.
Dirac and the dispensability of mathematics.Otavio Bueno - 2005 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 36 (3):465-490.

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References found in this work

Science Without Numbers: A Defence of Nominalism.Hartry H. Field - 1980 - Princeton, NJ, USA: Princeton University Press.
The Scientific Image.William Demopoulos & Bas C. van Fraassen - 1982 - Philosophical Review 91 (4):603.
Laws and Symmetry.Bas C. Van Fraassen - 1989 - Revue Philosophique de la France Et de l'Etranger 182 (3):327-329.
Realism, Mathematics, and Modality.Hartry Field - 1988 - Philosophical Topics 16 (1):57-107.
Science without numbers, A Defence of Nominalism.Hartry Field - 1980 - Revue Philosophique de la France Et de l'Etranger 171 (4):502-503.

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