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In mathematics, the axiom of power set is one of the
Zermelo-Fraenkel axioms of axiomatic set theory.
In the formal language of the Zermelo-Fraenkel axioms, the axiom
reads:
- ∀ A, ∃ B, ∀ C, C ∈ B ↔ (∀ D, D ∈
C → D ∈ A);
or in words:
- Given any set A, there is a set B such that, given any set C, C is a member of B
if and only if, given any set D, if D is a member of C, then D is a member of
A.
To understand this axiom, note that the clause in parentheses in the symbolic statement above simply states that C is a
subset of A. Thus, what the axiom is really saying is that, given a set
A, we can find a set B whose members are precisely the subsets of A. We can use the axiom of extensionality to show that this set B is
unique. We call the set B the power set of A, and denote
it PA. Thus the essence of the axiom is:
- Every set has a power set.
The axiom of power set is generally considered uncontroversial, and it or an equivalent appears in just about any alternative
axiomatisation of set theory.
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