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Aristotelian logic, axioms, and abstraction
Philosophia Mathematica 11 (2):195-202 (2003)
Abstract
Stewart Shapiro and Alan Weir have argued that a crucial part of the demonstration of Frege's Theorem (specifically, that Hume's Principle implies that there are infinitely many objects) fails if the Neo-logicist cannot assume the existence of the empty property, i.e., is restricted to so-called Aristotelian Logic. Nevertheless, even in the context of Aristotelian Logic, Hume's Principle implies much of the content of Peano Arithmetic. In addition, their results do not constitute an objection to Neo-logicism so much as a clarification regarding the view of logic that the Neo-logicist must take.Author's Profile
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Citations of this work
A Puzzle About Ontological Commitments.Philip A. Ebert - 2008 - Philosophia Mathematica 16 (2):209-226.
A Puzzle About Ontological Commitments: Reply to Ebert.Ivan Kasa - 2010 - Philosophia Mathematica 18 (1):102-105.
Forever Finite: The Case Against Infinity (Expanded Edition).Kip K. Sewell - 2023 - Alexandria, VA: Rond Books.
References found in this work
The reason's proper study: essays towards a neo-Fregean philosophy of mathematics.Crispin Wright & Bob Hale - 2001 - Oxford: Clarendon Press. Edited by Crispin Wright.
Frege's conception of numbers as objects.Crispin Wright - 1983 - [Aberdeen]: Aberdeen University Press.
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