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In [[logic]] a '''branching quantifier''',<ref name="PetersWesterståhl2006">{{cite book|author1=Stanley Peters|author2=Dag Westerståhl|title=Quantifiers in language and logic|year=2006|publisher=Clarendon Press|isbn=978-0-19-929125-0|pages=66–72}}</ref> also called a '''Henkin quantifier''', '''finite partially ordered quantifier''' or even '''nonlinear quantifier''', is a partial ordering<ref name="Badia2009">{{cite book|author=Antonio Badia|title=Quantifiers in Action: Generalized Quantification in Query, Logical and Natural Languages|url=http://books.google.com/books?id=WC4pkt3m5b0C&pg=PA74|year=2009|publisher=Springer|isbn=978-0-387-09563-9|page=74&ndash;76}}</ref>
 
:<math>\langle Qx_1\dots Qx_n\rangle</math>
 
of [[quantifier]]s for Q∈{∀,∃}. It is a special case of [[generalized quantifier]]. In  [[classical logic]], quantifier prefixes are linearly ordered such that the value of a variable ''y<sub>m</sub>'' bound by a quantifier ''Q<sub>m</sub>'' depends on the value of the variables
 
:y<sub>1</sub>,...,y<sub>m-1</sub>
 
bound by quantifiers
 
:Qy<sub>1</sub>,...,Qy<sub>m-1</sub>
 
preceding ''Q<sub>m</sub>''. In a logic with (finite) partially ordered quantification this is not in general the case.
 
Branching quantification first appeared in a 1959 conference paper of [[Leon Henkin]].<ref>Henkin, L. "Some Remarks on Infinitely Long Formulas". ''Infinitistic Methods: Proceedings of the Symposium on Foundations of Mathematics, Warsaw, 2–9 September 1959'', Panstwowe Wydawnictwo Naukowe and Pergamon Press, Warsaw, 1961, pp. 167-183. {{OCLC|2277863}}</ref> Systems of partially ordered quantification are intermediate in strength between first-order logic and second-order logic. They are being used as a basis for [[Jaakko Hintikka|Hintikka's]] and Gabriel Sandu's [[independence-friendly logic]].
 
==Definition and properties==
 
The simplest Henkin quantifier <math>Q_H</math> is
 
:<math>(Q_Hx_1,x_2,y_1,y_2)\phi(x_1,x_2,y_1,y_2)\equiv\begin{pmatrix}\forall x_1 \exists y_1\\ \forall x_2 \exists y_2\end{pmatrix}\phi(x_1,x_2,y_1,y_2)</math>.
 
It (in fact every formula with a Henkin prefix, not just the simplest one) is equivalent to its second-order [[Skolemization]], i.e.
 
:<math>\exists f \exists g \forall x_1 \forall x_2\phi (x_1,x_2,f(x_1),g(x_2))</math>.
 
It is also powerful enough to define the quantifier <math>Q_{\geq\mathbb{N}}</math> (i.e. "there are infinitely many") defined as
 
:<math>(Q_{\geq\mathbb{N}}x)\phi (x)\equiv\exists a(Q_Hx_1,x_2,y_1,y_2)[\phi a\land (x_1=x_2 \leftrightarrow y_1=y_2) \land (\phi (x_1)\rightarrow (\phi (y_1)\land y_1\neq a))]</math>.
 
Several things follow from this, including the nonaxiomatizability of first-order logic with <math>Q_H</math> (first observed by [[Ehrenfeucht]]), and its equivalence to the <math>\Sigma_1^1</math>-fragment of [[second-order logic]] ([[existential second-order logic]])&mdash;the latter result published independently in 1970 by [[Herbert Enderton]]<ref>Jaakko Hintikka and Gabriel Sandu, "Game-theoretical semantics", in ''Handbook of logic and language'', ed. J. van Benthem and A. ter Meulen, Elsevier 2011 (2nd ed.) citing Enderton, H.B., 1970. Finite {{Sic|hide=y|partially|-}}ordered quantifiers. Z. Math. Logik Grundlag. Math. 16, 393–397 {{doi|10.1002/malq.19700160802}}.</ref> and W. Walkoe.<ref>{{cite doi|10.1016/0168-0072(86)90040-0}} citing W. Walkoe, Finite {{Sic|hide=y|partially|-}}ordered quantification, J. Symbolic Logic 35 (1970) 535-555. {{jstor|2271440}}</ref>
 
The following quantifiers are also definable by <math>Q_H</math>.<ref name="Badia2009"/>
 
* Rescher: "The number of φs is less than or equal to the number of ψs"
 
:<math>(Q_Lx)(\phi x,\psi x)\equiv Card(\{ x \colon\phi x\} )\leq Card(\{ x \colon\psi x\} ) \equiv (Q_Hx_1x_2y_1y_2)[(x_1=x_2 \leftrightarrow y_1=y_2) \land (\phi x_1 \rightarrow \psi y_1)]</math>
 
* Härtig: "The φs are equinumerous with the ψs"
 
:<math>(Q_Ix)(\phi x,\psi x)\equiv (Q_Lx)(\phi x,\psi x) \land (Q_Lx)(\psi x,\phi x)</math>
 
* Chang: "The number of φs is equinumerous with the domain of the model"
 
:<math>(Q_Cx)(\phi x)\equiv (Q_Lx)(x=x,\phi x)</math>
 
The Henkin quantifier <math>Q_H</math> can itself be expressed as a type (4) [[Lindström quantifier]].<ref name="Badia2009"/>
 
== Relation to natural languages ==
Hintikka in a 1973 paper<ref>{{cite doi|10.1111/j.1746-8361.1973.tb00624.x}}</ref> advanced the hypothesis that some sentences in natural languages are best understood in terms of branching quantifiers, for example: "some relative of each villager and some relative of each townsman hate each other" is supposed to be interpreted, according to Hintikka, as:<ref name="Amsterdam">{{cite doi|10.1093/jos/ffp008}}</ref><ref>{{cite doi|10.1007/BF00630749}}</ref>
 
: <math>\begin{pmatrix}\forall x_1 \exists y_1\\ \forall x_2 \exists y_2\end{pmatrix} [(V(x_1) \wedge T(x_2)) \rightarrow (R(x_1,y_1) \wedge R(x_2,y_2) \wedge H(y_1, y_2) \wedge H(y_2, y_1))]</math>.
 
which is known to have no first-order logic equivalent.<ref name="Amsterdam"/>
 
The idea of branching is not necessarily restricted to using the classical quantifiers as leafs. In a 1979 paper,<ref>{{cite doi|10.1007/BF00258419}}</ref> [[Jon Barwise]] proposed variations of Hintikka sentences (as the above is sometimes called) in which the inner quantifiers are themselves [[generalized quantifiers]], for example: "Most villagers and most townsmen hate each other."<ref name="Amsterdam"/> Observing that <math>\Sigma_1^1</math> is not closed under negation, Barwise also proposed a practical test to determine whether natural language sentences really involve branching quantifiers, namely to test whether their natural-language negation involves universal quantification over a set variable (a <math>\Pi_1^1</math> sentence).<ref>{{cite journal | first1 = Michael | last1 = Hand | title = The Journal of Symbolic Logic | volume = 63 | issue = 4 | year = 1998 | publisher = Association for Symbolic Logic | jstor = 2586678 | pages = 1611–1614 }}</ref>
 
Hintikka's proposal was met with skepticism by a number of logicians because some first-order sentences like the one below appear to capture well enough the natural language Hintikka sentence.
 
: <math>[\forall x_1 \exists y_1 \forall x_2 \exists y_2\, \phi (x_1, x_2, y_1, y_2)] \wedge [\forall x_2 \exists y_2 \forall x_1 \exists y_1\, \phi (x_1, x_2, y_1, y_2)]</math> where
: <math>\phi (x_1, x_2, y_1, y_2)</math> denotes <math>(V(x_1) \wedge T(x_2)) \rightarrow (R(x_1,y_1) \wedge R(x_2,y_2) \wedge H(y_1, y_2) \wedge H(y_2, y_1))</math>
 
Although much purely theoretical debate followed, it wasn't until 2009 that some empirical tests with students trained in logic found that they are more likely to assign models matching the "bidirectional" first-order sentence rather than branching-quantifier sentence to several natural-language constructs derived from the Hintikka sentence. For instance students were shown undirected [[bipartite graph]]s&mdash;with squares and circles as vertices&mdash;and asked to say whether sentences like "more than 3 circles and more than 3 squares are connected by lines" were correctly describing the diagrams.<ref name="Amsterdam"/>
 
== See also ==
* [[Game_semantics | Game Semantics]]
* [[Dependence_logic | Dependence Logic]]
* [[Independence-friendly_logic | IF logic]]
* [[Mostowksi quantifier]]
* [[Lindström quantifier]]
* [[Nonfirstorderizability]]
 
== References ==
{{reflist}}
 
==External links==
 
* [http://planetmath.org/encyclopedia/Branching.html Game-theoretical quantifier] at PlanetMath.
 
[[Category:Quantification]]

Revision as of 11:22, 26 January 2014

In logic a branching quantifier,[1] also called a Henkin quantifier, finite partially ordered quantifier or even nonlinear quantifier, is a partial ordering[2]

Qx1Qxn

of quantifiers for Q∈{∀,∃}. It is a special case of generalized quantifier. In classical logic, quantifier prefixes are linearly ordered such that the value of a variable ym bound by a quantifier Qm depends on the value of the variables

y1,...,ym-1

bound by quantifiers

Qy1,...,Qym-1

preceding Qm. In a logic with (finite) partially ordered quantification this is not in general the case.

Branching quantification first appeared in a 1959 conference paper of Leon Henkin.[3] Systems of partially ordered quantification are intermediate in strength between first-order logic and second-order logic. They are being used as a basis for Hintikka's and Gabriel Sandu's independence-friendly logic.

Definition and properties

The simplest Henkin quantifier QH is

(QHx1,x2,y1,y2)ϕ(x1,x2,y1,y2)(x1y1x2y2)ϕ(x1,x2,y1,y2).

It (in fact every formula with a Henkin prefix, not just the simplest one) is equivalent to its second-order Skolemization, i.e.

fgx1x2ϕ(x1,x2,f(x1),g(x2)).

It is also powerful enough to define the quantifier Q (i.e. "there are infinitely many") defined as

(Qx)ϕ(x)a(QHx1,x2,y1,y2)[ϕa(x1=x2y1=y2)(ϕ(x1)(ϕ(y1)y1a))].

Several things follow from this, including the nonaxiomatizability of first-order logic with QH (first observed by Ehrenfeucht), and its equivalence to the Σ11-fragment of second-order logic (existential second-order logic)—the latter result published independently in 1970 by Herbert Enderton[4] and W. Walkoe.[5]

The following quantifiers are also definable by QH.[2]

  • Rescher: "The number of φs is less than or equal to the number of ψs"
(QLx)(ϕx,ψx)Card({x:ϕx})Card({x:ψx})(QHx1x2y1y2)[(x1=x2y1=y2)(ϕx1ψy1)]
  • Härtig: "The φs are equinumerous with the ψs"
(QIx)(ϕx,ψx)(QLx)(ϕx,ψx)(QLx)(ψx,ϕx)
  • Chang: "The number of φs is equinumerous with the domain of the model"
(QCx)(ϕx)(QLx)(x=x,ϕx)

The Henkin quantifier QH can itself be expressed as a type (4) Lindström quantifier.[2]

Relation to natural languages

Hintikka in a 1973 paper[6] advanced the hypothesis that some sentences in natural languages are best understood in terms of branching quantifiers, for example: "some relative of each villager and some relative of each townsman hate each other" is supposed to be interpreted, according to Hintikka, as:[7][8]

(x1y1x2y2)[(V(x1)T(x2))(R(x1,y1)R(x2,y2)H(y1,y2)H(y2,y1))].

which is known to have no first-order logic equivalent.[7]

The idea of branching is not necessarily restricted to using the classical quantifiers as leafs. In a 1979 paper,[9] Jon Barwise proposed variations of Hintikka sentences (as the above is sometimes called) in which the inner quantifiers are themselves generalized quantifiers, for example: "Most villagers and most townsmen hate each other."[7] Observing that Σ11 is not closed under negation, Barwise also proposed a practical test to determine whether natural language sentences really involve branching quantifiers, namely to test whether their natural-language negation involves universal quantification over a set variable (a Π11 sentence).[10]

Hintikka's proposal was met with skepticism by a number of logicians because some first-order sentences like the one below appear to capture well enough the natural language Hintikka sentence.

[x1y1x2y2ϕ(x1,x2,y1,y2)][x2y2x1y1ϕ(x1,x2,y1,y2)] where
ϕ(x1,x2,y1,y2) denotes (V(x1)T(x2))(R(x1,y1)R(x2,y2)H(y1,y2)H(y2,y1))

Although much purely theoretical debate followed, it wasn't until 2009 that some empirical tests with students trained in logic found that they are more likely to assign models matching the "bidirectional" first-order sentence rather than branching-quantifier sentence to several natural-language constructs derived from the Hintikka sentence. For instance students were shown undirected bipartite graphs—with squares and circles as vertices—and asked to say whether sentences like "more than 3 circles and more than 3 squares are connected by lines" were correctly describing the diagrams.[7]

See also

References

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  3. Henkin, L. "Some Remarks on Infinitely Long Formulas". Infinitistic Methods: Proceedings of the Symposium on Foundations of Mathematics, Warsaw, 2–9 September 1959, Panstwowe Wydawnictwo Naukowe and Pergamon Press, Warsaw, 1961, pp. 167-183. Template:OCLC
  4. Jaakko Hintikka and Gabriel Sandu, "Game-theoretical semantics", in Handbook of logic and language, ed. J. van Benthem and A. ter Meulen, Elsevier 2011 (2nd ed.) citing Enderton, H.B., 1970. Finite Template:Sicordered quantifiers. Z. Math. Logik Grundlag. Math. 16, 393–397 21 year-old Glazier James Grippo from Edam, enjoys hang gliding, industrial property developers in singapore developers in singapore and camping. Finds the entire world an motivating place we have spent 4 months at Alejandro de Humboldt National Park..
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