On hereditarily small sets in ZF
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We show in (the usual set theory without Choice) that for any set X, the collection of sets Y such that each element of the transitive closure of is strictly smaller in size than X (the collection of sets hereditarily smaller than X) is a set. This result has been shown by Jech in the case (where the collection under consideration is the set of hereditarily countable sets).
[1] Thomas E. Forster. Permutations and wellfoundedness: the true meaning of the bizarre arithmetic of Quine's NF , 2006, J. Symb. Log..
[2] Thomas Jech,et al. On hereditarily countable sets , 1982, Journal of Symbolic Logic.