axiom of pairing

In axiomatic set theory and the branches of logic, mathematics, and computer science that use it, the axiom of pairing is one of the axioms of Zermelo-Fraenkel set theory. In the formal language of the Zermelo-Frankel axioms, the axiom reads:

\forall A, \forall B, \exist C, \forall D, D \in C \Leftrightarrow (D = A \or D = B)

or in words:

Given any set A and any set B, there is a set C such that, given any set D, D is a member of C if and only if D is equal to A or D is equal to B.

What the axiom is really saying is that, given two sets A and B, we can find a set C whose members are precisely A and B. We can use the axiom of extensionality to show that this set C is unique. We call the set C the pair of A and B, and denote it {A,B}. Thus the essence of the axiom is:

Any two sets have a pair.

{A,A} is abbreviated {A}, called the singleton containing A. Note that a singleton is a special case of a pair. The axiom of pairing is generally considered uncontroversial, and it or an equivalent appears in just about any alternative axiomatization of set theory.

Generalisation

Together with the axiom of empty set, the axiom of pairing can be generalised to the following statement:

\forall A_1, \ldots, \forall A_n, \exist C, \forall D, D \in C \Leftrightarrow (D = A_1 \or \cdot \cdot \cdot

  \or D = A_n)

that is:

Given any finite number of sets A₁ through A_n, there is a set C whose members are precisely A₁ through A_n.

This set C is again unique by the axiom of extension, and is denoted {A₁,...,A_n}. Of course, we can't refer to a finite number of sets rigorously without already having in our hands a (finite) set to which the sets in question belong. Thus, this is not a single statement but instead a schema, with a separate statement for each natural number n. The case n = 0 is simply the axiom of empty set. The case n = 1 is the axiom of pairing with A = A₁ and B = A₁. The case n = 2 is the axiom of pairing with A = A₁ and B = A₂. The cases n > 2 can be proved using the axiom of pairing and the axiom of union multiple times. For example, to prove the case n = 3, use the axiom of pairing three times, to produce the pair {A₁,A₂}, the singleton {A₃}, and then the pair . The axiom of union then produces the desired result, {A₁,A₂,A₃}. Thus, one may use this as an axiom schema in the place of the axioms of empty set and pairing. Normally, however, one uses the axioms of empty set and pairing separately, and then proves this as a theorem schema. Note that adopting this as an axiom schema will not replace the axiom of union, which is still needed for other situations.

<< Previous

Word Browser

Next >>

allegany county, new york
robber baron
broome county, new york
cattaraugus county, new york
cayuga county, new york
chautauqua county, new york
idiolect
ecolect
finite language
aitutaki
uss merrimac

brahmic family
nebuchadnezzar ii of babylon
irish election results
gaspar corte real
ogimachi
trinity college
german museum of technology (berlin)
eroticism
imaginary unit
arapaho
lincoln memorial

titanic (1997 movie)
axiom of extensionality
thermite
watergate scandal
axiom schema of specification
axiom schema of replacement
independence day (movie)
armageddon (movie)
gladiator (2000 movie)
prince maximilian of baden
alien (movie)

martha argerich
umtata
haircut
facial hair
24th century bc
2022
2023
42 bc
50 bc
2024
2025