axiom of power set

Proper noun

 * 1)  The axiom that the power set of any set exists and is a valid set, which appears in the standard axiomatisation of set theory, ZFC.
 * 2) * 2012,, (editor), Mathematical Logic: An Introduction to Model Theory, Plenum Press, Softcover, page 292,
 * The Axiom of Power Set asserts that the collection of all subsets of a set is a set.Adding the Axiom of Power Set compels the collection $$\{\empty\}$$ to be a set.
 * 1) * 2012,, (editor), Mathematical Logic: An Introduction to Model Theory, Plenum Press, Softcover, page 292,
 * The Axiom of Power Set asserts that the collection of all subsets of a set is a set.Adding the Axiom of Power Set compels the collection $$\{\empty\}$$ to be a set.
 * The Axiom of Power Set asserts that the collection of all subsets of a set is a set.Adding the Axiom of Power Set compels the collection $$\{\empty\}$$ to be a set.

Translations

 * Finnish: potenssijoukkoaksiooma
 * Italian: assioma dell'insieme potenza