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13430 | Infinity: there is an infinity of distinguishable individuals [Ramsey] |
Full Idea: The Axiom of Infinity means that there are an infinity of distinguishable individuals, which is an empirical proposition. | |
From: Frank P. Ramsey (The Foundations of Mathematics [1925], §5) | |
A reaction: The Axiom sounds absurd, as a part of a logical system, but Ramsey ends up defending it. Logical tautologies, which seem to be obviously true, are rendered absurd if they don't refer to any objects, and some of them refer to infinities of objects. |
13428 | Reducibility: to every non-elementary function there is an equivalent elementary function [Ramsey] |
Full Idea: The Axiom of Reducibility asserted that to every non-elementary function there is an equivalent elementary function [note: two functions are equivalent when the same arguments render them both true or both false]. | |
From: Frank P. Ramsey (The Foundations of Mathematics [1925], §2) | |
A reaction: Ramsey in the business of showing that this axiom from Russell and Whitehead is not needed. He says that the axiom seems to be needed for induction and for Dedekind cuts. Since the cuts rest on it, and it is weak, Ramsey says it must go. |