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Single Idea 10771
[filed under theme 5. Theory of Logic / K. Features of Logics / 6. Compactness
]
Full Idea
It is strange that compactness is often ignored in discussions of philosophy of logic, since the most important theories have infinitely many axioms.
Gist of Idea
Compactness is important for major theories which have infinitely many axioms
Source
Leslie H. Tharp (Which Logic is the Right Logic? [1975], §2)
Book Ref
'Philosophy of Logic: an anthology', ed/tr. Jacquette,Dale [Blackwell 2002], p.38
A Reaction
An example of infinite axioms is the induction schema in first-order Peano Arithmetic.
The
17 ideas
with the same theme
[satisfaction by satisfying the finite subsets]:
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9995
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Proof in finite subsets is sufficient for proof in an infinite set
[Enderton]
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10771
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Compactness is important for major theories which have infinitely many axioms
[Tharp]
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10772
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Compactness blocks infinite expansion, and admits non-standard models
[Tharp]
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13544
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Inconsistency or entailment just from functors and quantifiers is finitely based, if compact
[Bostock]
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13618
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Compactness means an infinity of sequents on the left will add nothing new
[Bostock]
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13841
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Why should compactness be definitive of logic?
[Boolos, by Hacking]
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10287
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If a first-order theory entails a sentence, there is a finite subset of the theory which entails it
[Hodges,W]
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13496
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First-order logic is 'compact': consequences of a set are consequences of a finite subset
[Hart,WD]
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17789
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No logic which can axiomatise arithmetic can be compact or complete
[Mayberry]
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13630
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Non-compactness is a strength of second-order logic, enabling characterisation of infinite structures
[Shapiro]
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13646
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Compactness is derived from soundness and completeness
[Shapiro]
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13699
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Compactness surprisingly says that no contradictions can emerge when the set goes infinite
[Sider]
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10977
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Compactness blocks the proof of 'for every n, A(n)' (as the proof would be infinite)
[Read]
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10976
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Compactness makes consequence manageable, but restricts expressive power
[Read]
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10974
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Compactness is when any consequence of infinite propositions is the consequence of a finite subset
[Read]
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10975
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Compactness does not deny that an inference can have infinitely many premisses
[Read]
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17867
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If a concept is not compact, it will not be presentable to finite minds
[Almog]
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