Back Schéma nahrazení Czech Ersetzungsaxiom German Αξιωματικό σχήμα της αντικατάστασης Greek Esquema axiomático de reemplazo Spanish اصول موضوع جایگزینی Persian Schéma d'axiomes de remplacement French אקסיומת ההחלפה HE Schema di assiomi di rimpiazzamento Italian 置換公理 Japanese Aksjomat zastępowania Polish
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In set theory, the axiom schema of replacement is a schema of axioms in Zermelo–Fraenkel set theory (ZF) that asserts that the image of any set under any definable mapping is also a set. It is necessary for the construction of certain infinite sets in ZF.
The axiom schema is motivated by the idea that whether a class is a set depends only on the cardinality of the class, not on the rank of its elements. Thus, if one class is "small enough" to be a set, and there is a surjection from that class to a second class, the axiom states that the second class is also a set. However, because ZFC only speaks of sets, not proper classes, the schema is stated only for definable surjections, which are identified with their defining formulas.
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