Cowen's Theorem

Theorem
Let $g$ be a progressing mapping.

Let $x$ be a set.

Let $\powerset x$ denote the power set of $x$.

Let $M_x$ denote the intersection of the $x$-special subsets of $\powerset x$ $g$.

Let $M$ be the class of all $z$ such that $z \in M_x$.

Then $M$ is minimally superinductive under $g$.