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Single Idea 10580
[filed under theme 6. Mathematics / C. Sources of Mathematics / 6. Logicism / c. Neo-logicism
]
Full Idea
Mathematics seems necessary because the real contents of mathematical statements are logical truths, which are necessary, and it seems a priori because logical truths really are a priori.
Gist of Idea
Mathematics is both necessary and a priori because it really consists of logical truths
Source
Stephen Yablo (Abstract Objects: a Case Study [2002], 10)
Book Ref
-: 'Nous' [-], p.237
A Reaction
Yablo says his logicism has a Kantian strain, because numbers and sets 'inscribed on our spectacles', but he takes a different view (in the present Idea) from Kant about where the necessity resides. Personally I am tempted by an a posteriori necessity.
The
15 ideas
with the same theme
[revival of logicism after much criticism]:
21718
|
Ramified types can be defended as a system of intensional logic, with a 'no class' view of sets
[Russell, by Linsky,B]
|
18144
|
Neo-logicists agree that HP introduces number, but also claim that it suffices for the job
[Bostock]
|
18147
|
Neo-logicists meet the Caesar problem by saying Hume's Principle is unique to number
[Bostock]
|
7804
|
Wright has revived Frege's discredited logicism
[Wright,C, by Benardete,JA]
|
13899
|
The Peano Axioms, and infinity of cardinal numbers, are logical consequences of how we explain cardinals
[Wright,C]
|
13896
|
The aim is to follow Frege's strategy to derive the Peano Axioms, but without invoking classes
[Wright,C]
|
10622
|
The neo-Fregean is more optimistic than Frege about contextual definitions of numbers
[Hale/Wright]
|
8783
|
Logicism might also be revived with a quantificational approach, or an abstraction-free approach
[Hale/Wright]
|
12225
|
Neo-Fregeanism might be better with truth-makers, rather than quantifier commitment
[Hale/Wright]
|
10580
|
Mathematics is both necessary and a priori because it really consists of logical truths
[Yablo]
|
9224
|
Proceduralism offers a version of logicism with no axioms, or objects, or ontological commitment
[Fine,K]
|
13664
|
Logicism is distinctive in seeking a universal language, and denying that logic is a series of abstractions
[Shapiro]
|
18167
|
We can get arithmetic directly from HP; Law V was used to get HP from the definition of number
[Maddy]
|
19295
|
Add Hume's principle to logic, to get numbers; arithmetic truths rest on the nature of the numbers
[Hale]
|
21648
|
Neo-Fregeans are dazzled by a technical result, and ignore practicalities
[Hofweber]
|