Anti-nominalism reconsidered

Philosophical Quarterly 57 (226):104–111 (2007)
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Abstract

Many philosophers of mathematics are attracted by nominalism – the doctrine that there are no sets, numbers, functions, or other mathematical objects. John Burgess and Gideon Rosen have put forward an intriguing argument against nominalism, based on the thought that philosophy cannot overrule internal mathematical and scientific standards of acceptability. I argue that Burgess and Rosen’s argument fails because it relies on a mistaken view of what the standards of mathematics require.

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10.1111/j.1467-9213.2007.472.x

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David Liggins
University of Manchester

Citations of this work

In defence of error theory.Chris Daly & David Liggins - 2010 - Philosophical Studies 149 (2):209-230.
Deferentialism.Chris Daly & David Liggins - 2011 - Philosophical Studies 156 (3):321-337.

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References found in this work

Mathematics and bleak house.John P. Burgess - 2004 - Philosophia Mathematica 12 (1):18-36.
Book Reviews. [REVIEW]John P. Burgess - 1993 - Philosophia Mathematica 1 (2):180-188.
Book reviews. [REVIEW]John P. Burgess - 1993 - Philosophia Mathematica 1 (2):637-639.

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