The extension of a predicate – a truth-valued function – is the set of tuples of values that, used as arguments, satisfy the predicate. Such a set of tuples is a relation.
Examples
For example, the statement "d2 is the weekday following d1" can be seen as a truth function associating to each tuple (d2, d1) the value true or false. The extension of this truth function is, by convention, the set of all such tuples associated with the value true, i.e.
{(Monday, Sunday), (Tuesday, Monday), (Wednesday, Tuesday), (Thursday, Wednesday), (Friday, Thursday), (Saturday, Friday), (Sunday, Saturday)} By examining this extension we can conclude that "Tuesday is the weekday following Saturday" (for example) is false.
Using set-builder notation, the extension of the n-ary predicate 
can be written as
Relationship with characteristic function
If the values 0 and 1 in the range of a characteristic function are identified with the values false and true, respectively – making the characteristic function a predicate – , then for all relations R and predicates the following two statements are equivalent:
![image]()
is the characteristic function of R- R is the extension of
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See also
- Extensional logic
- Extensional set
- Extensionality
- Intension
References
- extension (semantics) in nLab
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The extension of a predicate a truth valued function is the set of tuples of values that used as arguments satisfy the predicate Such a set of tuples is a relation ExamplesFor example the statement d2 is the weekday following d1 can be seen as a truth function associating to each tuple d2 d1 the value true or false The extension of this truth function is by convention the set of all such tuples associated with the value true i e Monday Sunday Tuesday Monday Wednesday Tuesday Thursday Wednesday Friday Thursday Saturday Friday Sunday Saturday By examining this extension we can conclude that Tuesday is the weekday following Saturday for example is false Using set builder notation the extension of the n ary predicate F displaystyle Phi can be written as x1 xn F x1 xn displaystyle x 1 x n mid Phi x 1 x n Relationship with characteristic functionIf the values 0 and 1 in the range of a characteristic function are identified with the values false and true respectively making the characteristic function a predicate then for all relations R and predicates F displaystyle Phi the following two statements are equivalent F displaystyle Phi is the characteristic function of R R is the extension of F displaystyle Phi See alsoExtensional logic Extensional set Extensionality IntensionReferencesextension semantics in nLab This logic related article is a stub You can help Wikipedia by expanding it vte This mathematical logic related article is a stub You can help Wikipedia by expanding it vte
