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Single Idea 17927
[filed under theme 6. Mathematics / C. Sources of Mathematics / 1. Mathematical Platonism / b. Against mathematical platonism
]
Full Idea
Benacerraf argues that realists about mathematical objects have a nice normal semantic but no epistemology, and anti-realists have a good epistemology but an unorthodox semantics.
Gist of Idea
Realists have semantics without epistemology, anti-realists epistemology but bad semantics
Source
report of Paul Benacerraf (Mathematical Truth [1973]) by Mark Colyvan - Introduction to the Philosophy of Mathematics 1.2
Book Ref
Colyvan,Mark: 'An Introduction to the Philosophy of Mathematics' [CUP 2012], p.8
The
31 ideas
from Paul Benacerraf
13411
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If numbers are basically the cardinals (Frege-Russell view) you could know some numbers in isolation
[Benacerraf]
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13412
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Obtaining numbers by abstraction is impossible - there are too many; only a rule could give them, in order
[Benacerraf]
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13413
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We must explain how we know so many numbers, and recognise ones we haven't met before
[Benacerraf]
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13415
|
An adequate account of a number must relate it to its series
[Benacerraf]
|
17927
|
Realists have semantics without epistemology, anti-realists epistemology but bad semantics
[Benacerraf, by Colyvan]
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9935
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Mathematical truth is always compromising between ordinary language and sensible epistemology
[Benacerraf]
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9936
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The platonist view of mathematics doesn't fit our epistemology very well
[Benacerraf]
|
8697
|
Disputes about mathematical objects seem irrelevant, and mathematicians cannot resolve them
[Benacerraf, by Friend]
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8304
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No particular pair of sets can tell us what 'two' is, just by one-to-one correlation
[Benacerraf, by Lowe]
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9151
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Benacerraf says numbers are defined by their natural ordering
[Benacerraf, by Fine,K]
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13891
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To understand finite cardinals, it is necessary and sufficient to understand progressions
[Benacerraf, by Wright,C]
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17904
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A set has k members if it one-one corresponds with the numbers less than or equal to k
[Benacerraf]
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9898
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We can count intransitively (reciting numbers) without understanding transitive counting of items
[Benacerraf]
|
17903
|
Someone can recite numbers but not know how to count things; but not vice versa
[Benacerraf]
|
9897
|
The application of a system of numbers is counting and measurement
[Benacerraf]
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17906
|
To explain numbers you must also explain cardinality, the counting of things
[Benacerraf]
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9901
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Numbers can't be sets if there is no agreement on which sets they are
[Benacerraf]
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9900
|
For Zermelo 3 belongs to 17, but for Von Neumann it does not
[Benacerraf]
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9899
|
The successor of x is either x and all its members, or just the unit set of x
[Benacerraf]
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9903
|
Number words are not predicates, as they function very differently from adjectives
[Benacerraf]
|
9904
|
The set-theory paradoxes mean that 17 can't be the class of all classes with 17 members
[Benacerraf]
|
9905
|
Identity statements make sense only if there are possible individuating conditions
[Benacerraf]
|
9906
|
If ordinal numbers are 'reducible to' some set-theory, then which is which?
[Benacerraf]
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9912
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There are no such things as numbers
[Benacerraf]
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9907
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If any recursive sequence will explain ordinals, then it seems to be the structure which matters
[Benacerraf]
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9908
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The job is done by the whole system of numbers, so numbers are not objects
[Benacerraf]
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9909
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The number 3 defines the role of being third in a progression
[Benacerraf]
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9911
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Number words no more have referents than do the parts of a ruler
[Benacerraf]
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9910
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Number-as-objects works wholesale, but fails utterly object by object
[Benacerraf]
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8925
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Mathematical objects only have properties relating them to other 'elements' of the same structure
[Benacerraf]
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9938
|
How can numbers be objects if order is their only property?
[Benacerraf, by Putnam]
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