Initial self-embeddings of models of set theory
Abstract
By a classical theorem of Harvey Friedman (1973), every countable nonstandard model M of a sufficiently strong fragment of ZF has a proper rank-initial self-embedding j, i.e., j is a self-embedding of M such that j[M]⊂neqM, and the ordinal rank of each member of j[M] is less than the ordinal rank of each element of M j[M]. Here we investigate the larger family of proper initial-embeddings j of models M of fragments of set theory, where the image of j is a transitive submodel of M.
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