In mathematical set theory, Zermelo's categoricity theorem was proven by Ernst Zermelo in 1930. It states that all models of a certain second-order version of the ZermeloâÂÂFraenkel axioms of set theory are isomorphic to a member of a certain class of sets.
Let denote ZermeloâÂÂFraenkel set theory, but with a second-order version of the axiom of replacement formulated as follows:
, namely the second-order universal closure of the axiom schema of replacement.<sup>p. 289</sup> Then every model of is isomorphic to a set in the von Neumann hierarchy, for some strongly inaccessible cardinal .
Zermelo originally considered a version of with urelements. Rather than using the modern satisfaction relation , he defines a "normal domain" to be a collection of sets along with the true relation that satisfies .<sup>p. 9</sup>
Dedekind proved that the second-order Peano axioms hold in a model if and only if the model is isomorphic to the true natural numbers.<sup>pp. 5âÂÂ6</sup><sup>p. 1</sup> Uzquiano proved that when removing replacement from and considering a second-order version of Zermelo set theory with a second-order version of separation, there exist models not isomorphic to any for a limit ordinal .<sup>p. 396</sup>