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Referring to Mathematical Objects via Definite Descriptions
Philosophia Mathematica 25 (1):128-138 (2017)
Abstract
Linsky and Zalta try to explain how we can refer to mathematical objects by saying that this happens through definite descriptions which may appeal to mathematical theories. I present two issues for their account. First, there is a problem of finding appropriate pre-conditions to reference, which are currently difficult to satisfy. Second, there is a problem of ensuring the stability of the resulting reference. Slight changes in the properties ascribed to a mathematical object can result in a shift of reference and this leads to various problems, e.g., it makes inferring knowledge much harder than it is.Other Versions
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Citations of this work
Mathematical descriptions.Bernard Linsky & Edward N. Zalta - 2019 - Philosophical Studies 176 (2):473-481.
References found in this work
Mathematics as a science of patterns: Ontology and reference.Michael Resnik - 1981 - Noûs 15 (4):529-550.
Naturalized platonism versus platonized naturalism.Bernard Linsky & Edward N. Zalta - 1995 - Journal of Philosophy 92 (10):525-555.
Fictionalism, theft, and the story of mathematics.Mark Balaguer - 2009 - Philosophia Mathematica 17 (2):131-162.
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