In The Consistency of Classical Set Theory Relative to a Set Theory with Intuitionistic Logic in THE JOURNAL OF SYMBOLIC LOGIC Volume 38, Number 2, June 1973 page 316 Harvey Friedman's axiom 8* $Weak \ Power \ Set$ is: $(\forall a)(\exists x)(\forall y)(\exists z\in x)(\forall w)(w\in z\leftrightarrow (w\in y \wedge w\in a))$ What do we know about weak power set? I am curious about what if anything weak power set can do when added to $KP\omega$ or $ZF-Power \ Set$.