Counting quantification: Difference between revisions

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Revision as of 04:57, 12 November 2022 edit 2601:547:b05:2bca:f1eb:f40a:2e3a:c4d1 (talk) Definition in terms of ordinary quantifiers ← Previous edit		Latest revision as of 01:57, 19 January 2025 edit undo 50.221.225.231 (talk) Improve formatting
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Line 1: {{Short description\|Mathematical logical term}} A '''counting quantifier''' is a [[Mathematics\|mathematical]] term for a [[Quantifier (logic)\|quantifier]] of the form "there exists at least ''k'' elements that satisfy property ''X''". In [[first-order logic]] with equality, counting quantifiers can be defined in terms of ordinary quantifiers, so in this context they are a notational shorthand. Line 10 ⟶ 11: Let <math>\exists_{= k}</math> denote "there exist exactly <math>k</math>". Then :<math>\begin{align} \~~exists^~~exists_{= 0} x F(P x) &\leftrightarrow \neg \exists x F(P x) \\ \~~exists^~~exists_{= k+1} x F(P x) &\leftrightarrow \exists x (F(P x) \land \~~exists^~~exists_{= k} y (P y \~~neq~~land xy \~~land~~neq ~~F(y)~~x)) \end{align}</math> Let <math>\exists_{\geq k}</math> denote "there exist at least <math>k</math>". Then :<math>\begin{align} \~~exists^~~exists_{\geq 0} x F(P x) &\leftrightarrow \top \\ \~~exists^~~exists_{\geq k+1} x F(P x) &\leftrightarrow \exists x (F(P x) \land \~~exists^~~exists_{\geq k} y (P y \~~neq~~land xy \~~land~~neq ~~F(y)~~x)) \end{align}</math> Line 22 ⟶ 23: [[Uniqueness quantification]] [[Lindström quantifier]] *[[Spectrum of a sentence]] == References ==