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9141 | Abstraction theories build mathematics out of second-order equivalence principles [Cook/Ebert] |
Full Idea: A theory of abstraction is any account that reconstructs mathematical theories using second-order abstraction principles of the form: §xFx = §xGx iff E(F,G). We ignore first-order abstraction principles such as Frege's direction abstraction. | |
From: R Cook / P Ebert (Notice of Fine's 'Limits of Abstraction' [2004], 1) | |
A reaction: Presumably part of the neo-logicist programme, which also uses such principles. The function § (extension operator) 'provides objects corresponding to the argument concepts'. The aim is to build mathematics, rather than the concept of a 'rabbit'. |