A choice-free cardinal equality
Abstract
For a cardinal a, let fin(a) be the cardinality of the set of all finite subsets of a set which is of cardinality a. It is proved without the aid of the axiom of choice that for all infinite cardinals a and all natural numbers n, \[ 2fin(a)n=2[fin(a)]n. \] On the other hand, it is proved that the following statement is consistent with ZF: there exists an infinite cardinal a such that \[ 2fin(a)<2fin(a)2<2fin(a)3<…<2fin(fin(a)). \]
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