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| In [[linguistics|linguistic]] [[semantics]], a '''generalized quantifier''' is an expression that denotes a [[Property (philosophy)|property]] of a property, also called a [[higher-order]] property. This is the standard semantics assigned to [[quantifier|quantified]] [[noun phrase]]s, also called [[determiner phrase]]s, or DP for short. In the example below, the DP ''every boy'' says of a property X that the [[set theory|set]] of entities that are ''boys'' is a [[subset]] of the set of entities that have property X. So the following sentence says that the set of boys is a subset of the set of sleepers.
| | Oscar is what my wife loves to call me and I completely dig that title. To gather coins is a factor that I'm totally addicted to. I am a meter reader but I plan on altering it. My family members lives in Minnesota and my family members enjoys it.<br><br>my homepage; over the counter std test, [http://www.teenvalley.net/blog/17832 check out this site], |
| ::Every boy sleeps.
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| ::<math>\{x\,|\, x \mbox{ is a boy}\} \subseteq \{x\,|\,x \mbox{ sleeps}\}</math>
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| This treatment of quantifiers has been essential in achieving a [[compositionality|compositional]] [[semantics]] for sentences containing quantifiers.<ref> Montague, Richard: 1974, '[http://www.blackwellpublishing.com/content/BPL_Images/Content_store/Sample_chapter/9780631215417/Portner.pdf The proper treatment of quantification in English]',
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| in R. Montague, Formal Philosophy, ed. by R. Thomason (New Haven). </ref><ref>Barwise, Jon and Robin Cooper. 1981. Generalized quantifiers and natural language. ''Linguistics and Philosophy'' 4: 159-219.</ref>
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| ==Type theory==
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| A version of [[type theory]] is often used to make the semantics of different kinds of expressions explicit. The standard construction defines the set of types [[recursion|recursively]] as follows:
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| #''e'' and ''t'' are types.
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| #If ''a'' and ''b'' are both types, then so is <math>\langle a,b\rangle</math>
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| #Nothing is a type, except what can be constructed on the basis of lines 1 and 2 above.
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| Given this definition, we have the simple types ''e'' and ''t'', but also a [[countable]] [[infinity]] of complex types, some of which include:
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| ::<math>\langle e,t\rangle;\qquad \langle t,t\rangle;\qquad \langle\langle e,t\rangle, t\rangle; \qquad\langle e,\langle e,t\rangle\rangle; \qquad \langle\langle e,t\rangle,\langle \langle e, t\rangle, t\rangle\rangle;\qquad \ldots</math>
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| *Expressions of type ''e'' denote elements of the [[universe of discourse]], the set of entities the discourse is about. This set is usually written as <math>D_e</math>. Examples of type ''e'' expressions include ''John'' and ''he''.
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| *Expressions of type ''t'' denote a [[truth value]], usually rendered as the set<math>\{0,1\}</math>, where 0 stands for "false" and 1 stands for "true". Examples of expressions that are sometimes said to be of type ''t'' are ''sentences'' or ''propositions''.
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| *Expressions of type <math>\langle e,t\rangle</math> denote [[Function (mathematics)|functions]] from the set of entities to the set of truth values. This set of functions is rendered as <math>D_t^{D_e}</math>. Such functions are [[Indicator function|characteristic functions]] of [[Set (mathematics)|sets]]. They map every individual that is an element of the set to "true", and everything else to "false." It is common to say that they denote ''sets'' rather than characteristic functions, although, strictly speaking, the latter is more accurate. Examples of expressions of this type are [[predicate (grammar)|predicates]], [[noun]]s and some kinds of [[adjective]]s.
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| *In general, expressions of complex types <math>\langle a,b\rangle</math> denote functions from the set of entities of type <math>a</math> to the set of entities of type <math>b</math>, a construct we can write as follows: <math>D_b^{D_a}</math>.
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| We can now assign types to the words in our sentence above (Every boy sleeps) as follows.
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| **Type(boy)=<math>\langle e,t\rangle</math>
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| **Type(sleeps)=<math>\langle e,t\rangle</math>
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| **Type(every)= <math>\langle\langle e,t\rangle,\langle \langle e, t\rangle, t\rangle\rangle</math>
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| Thus, every denotes a function from a ''set'' to a function from a set to a truth value. Put differently, it denotes a function from a set to a set of sets. It is that function which for any two sets ''A,B'', ''every''(''A'')(''B'')= 1 if and only if <math>A\subseteq B</math>.
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| ==Typed lambda calculus==
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| A useful way to write complex functions is the [[lambda calculus]]. For example, one can write the meaning of ''sleeps'' as the following lambda expression, which is a function from an individual ''x'' to the proposition that ''x sleeps''.
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| ::<math>\lambda x. sleep'(x)</math>
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| Such lambda terms are functions whose domain is what precedes the period, and whose range are the type of thing that follows the period. If ''x'' is a variable that ranges over elements of <math>D_e</math>, then the following lambda term denotes the [[identity function]] on individuals:
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| ::<math>\lambda x.x</math>
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| We can now write the meaning of ''every'' with the following lambda term, where ''X,Y'' are variables of type <math>\langle e,t\rangle</math>:
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| ::<math>\lambda X.\lambda Y. X\subseteq Y</math>
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| If we abbreviate the meaning of ''boy'' and ''sleeps'' as "''B''" and "''S''", respectively, we have that the sentence ''every boy sleeps'' now means the following:
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| ::<math>(\lambda X.\lambda Y. X\subseteq Y)(B)(S)</math> — [[Lambda calculus#β-reduction|β-reduction]]
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| ::<math>(\lambda Y. B \subseteq Y)(S)</math> — β-reduction
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| ::<math>B\subseteq S</math>
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| The expression ''every'' is a [[determiner (linguistics)|determiner]]. Combined with a [[noun]], it yields a ''generalized quantifier'' of type <math>\langle\langle e,t\rangle,t\rangle</math>.
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| ==Properties==
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| ===Monotonicity===
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| ====Monotone increasing GQs====
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| A ''generalized quantifier'' GQ is said to be [[monotone increasing]], also called [[upward entailing]], just in case, for any two sets ''X'' and ''Y'' the following holds:
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| ::if <math>X\subseteq Y</math>, then GQ(''X'') [[Entailment|entail]]s GQ(''Y'').
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| The GQ ''every boy'' is monotone increasing. For example, the set of things that ''run fast'' is a subset of the set of things that ''run''. Therefore, the first sentence below [[Entailment|entail]]s the second:
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| #Every boy runs fast.
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| #Every boy runs.
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| ====Monotone decreasing GQs====
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| A GQ is said to be [[monotone decreasing]], also called [[downward entailing]] just in case, for any two sets ''X'' and ''Y'', the following holds:
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| ::If <math>X\subseteq Y</math>, then GQ(''Y'') entails GQ(''X'').
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| An example of a monotone decreasing GQ is ''no boy''. For this GQ we have that the first sentence below entails the second.
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| #No boy runs.
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| #No boy runs fast.
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| The lambda term for the [[determiner (linguistics)|determiner]] ''no'' is the following. It says that the two sets have an empty [[Intersection (set theory)|intersection]].
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| ::<math>\lambda X.\lambda Y. X\cap Y= \emptyset</math>
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| Monotone decreasing GQs are among the expressions that can license a [[negative polarity item]], such as ''any''. Monotone increasing GQs do not license negative polarity items.
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| #Good: No boy has '''any''' money.
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| #Bad: *Every boy has '''any''' money.
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| ====Non-monotone GQs====
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| A GQ is said to be ''non-monotone'' if it is neither monotone increasing nor monotone decreasing. An example of such a GQ is ''exactly three boys''. Neither of the following two sentences entail the other.
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| #Exactly three students ran.
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| #Exactly three students ran fast.
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| The first sentence doesn't entail the second. The fact that the number of students that ran is exactly three doesn't entail that each of these students ''ran fast'', so the number of students that did that can be smaller than 3. Conversely, the second sentence doesn't entail the first. The sentence ''exactly three students ran fast'' can be true, even though the number of students who merely ran (i.e. not so fast) is greater than 3.
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| The lambda term for the (complex) [[determiner (linguistics)|determiner]] ''exactly three'' is the following. It says that the [[cardinality]] of the [[Intersection (set theory)|intersection]] between the two sets equals 3.
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| ::<math>\lambda X.\lambda Y. |X\cap Y|=3</math>
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| ===Conservativity===
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| A determiner D is said to be ''conservative'' if the following equivalence holds:
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| ::<math>D(A)(B)\leftrightarrow D(A)(A\cap B)</math>
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| For example, the following two sentences are equivalent.
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| #Every boy sleeps.
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| #Every boy is a boy who sleeps.
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| It has been proposed that ''all'' natural language determiners (i.e. in every language) are conservative (Barwise and Cooper 1981). The expression ''only'' is not conservative. The following two sentences are not equivalent. But it is, in fact not common to analyze ''only'' as a [[determiner (linguistics)|determiner]]. Rather, it is standardly treated as a [[focus-sensitive]] [[adverb]].
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| #Only boys sleep.
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| #Only boys are boys who sleep.
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| ==See also==
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| *[[Lindström quantifier]]
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| *[[Branching quantifier]]
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| ==References==
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| <references />
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| ==Further reading==
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| * {{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}}
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| * {{cite book|author=Antonio Badia|title=Quantifiers in Action: Generalized Quantification in Query, Logical and Natural Languages|year=2009|publisher=Springer|isbn=978-0-387-09563-9}}
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| ==External links==
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| *Dag Westerståhl, 2011. '[http://plato.stanford.edu/entries/generalized-quantifiers/ Generalized Quantifiers]'. [[Stanford Encyclopedia of Philosophy]].
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| [[Category:Semantics]]
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| [[Category:Quantification]]
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