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Single Idea 10866
[filed under theme 6. Mathematics / A. Nature of Mathematics / 5. The Infinite / a. The Infinite
]
Full Idea
As far as Kronecker was concerned, Cantor had built a whole structure on the irrational numbers, and so that structure had no foundation at all.
Gist of Idea
Cantor's account of infinities has the shaky foundation of irrational numbers
Source
Brian Clegg (Infinity: Quest to Think the Unthinkable [2003], Ch.15)
Book Ref
Clegg,Brian: 'Infinity' [Robinson 2003], p.193
The
20 ideas
from 'Infinity: Quest to Think the Unthinkable'
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10853
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Either lack of zero made early mathematics geometrical, or the geometrical approach made zero meaningless
[Clegg]
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10854
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Transcendental numbers can't be fitted to finite equations
[Clegg]
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10858
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By adding an axis of imaginary numbers, we get the useful 'number plane' instead of number line
[Clegg]
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10860
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An ordinal number is defined by the set that comes before it
[Clegg]
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10861
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Beyond infinity cardinals and ordinals can come apart
[Clegg]
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10859
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A set is 'well-ordered' if every subset has a first element
[Clegg]
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10857
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Set theory made a closer study of infinity possible
[Clegg]
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10864
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Any set can always generate a larger set - its powerset, of subsets
[Clegg]
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10862
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The 'continuum hypothesis' says aleph-one is the cardinality of the reals
[Clegg]
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10866
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Cantor's account of infinities has the shaky foundation of irrational numbers
[Clegg]
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10869
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The Continuum Hypothesis is independent of the axioms of set theory
[Clegg]
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10872
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Extensionality: Two sets are equal if and only if they have the same elements
[Clegg]
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10876
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Unions: There is a set of all the elements which belong to at least one set in a collection
[Clegg]
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10875
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Pairing: For any two sets there exists a set to which they both belong
[Clegg]
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10878
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Infinity: There exists a set of the empty set and the successor of each element
[Clegg]
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10877
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Powers: All the subsets of a given set form their own new powerset
[Clegg]
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10879
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Choice: For every set a mechanism will choose one member of any non-empty subset
[Clegg]
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10871
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Axiom of Existence: there exists at least one set
[Clegg]
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10874
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Specification: a condition applied to a set will always produce a new set
[Clegg]
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10880
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Mathematics can be 'pure' (unapplied), 'real' (physically grounded); or 'applied' (just applicable)
[Clegg]
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