Axiom of power set
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.
Referenced By
Axiomatic Set Theory | Formal set theory | List of mathematical logic topics | List of mathematical topics | List of mathematical topics (A-C) | List of mathematics topics | Zermelo-Fraenkel axiom | Zermelo-Fraenkel axioms | Zermelo-Fraenkel set theory | Zermelo-Frankel axioms | Zermelo set theory
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