Factorials of infinite cardinals in ZF

Abstract

For a set x, let S(x) be the set of all permutations of x. We study several aspects of this notion in ZF. The main results are as follows: (1) ZF proves that for all sets x, if S(x) is Dedekind infinite, then there are no finite-to-one maps from S(x) into Sfin(x), where Sfin(x) is the set of all permutations of x which move only finitely many elements. (2) ZF proves that for all sets x, the cardinality of S(x) is strictly greater than that of [x]2. (3) It is consistent with ZF that there exists an infinite set x such that the cardinality of S(x) is strictly less than that of [x]3. (4) It is consistent with ZF that there exists an infinite set x such that there is a finite-to-one map from S(x) into x.