Descriptions and unknowability

Analysis 70 (1):50-52 (2010)
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Abstract

In a recent paper Horsten embarked on a journey along the limits of the domain of the unknowable. Rather than knowability simpliciter, he considered a priori knowability, and by the latter he meant absolute provability, i.e. provability that is not relativized to a formal system. He presented an argument for the conclusion that it is not absolutely provable that there is a natural number of which it is true but absolutely unprovable that it has a certain property. The argument depends on a description principle. I will argue that the latter principle implies the knowability of all arithmetical truths. Therefore, Horsten's argument is either sound but its conclusion is trivial, or his argument is unsound.

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10.1093/analys/anp133

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Jan Heylen
KU Leuven

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References found in this work

Truth and truthmakers.D. M. Armstrong - 2004 - New York: Cambridge University Press.
A World of States of Affairs.D. M. Armstrong - 1993 - Philosophical Perspectives 7:429-440.
Truth and ontology.Trenton Merricks - 2007 - New York: Oxford University Press.
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