The twenty 3 vertices of the prolate Phi stella define the vetrices of a regular pentagonal dodecahedron or alternatively the vertices of a set of five cubes each on a different axis but sharing a common centre.

As with Phi stella the resulting combined solid can aggregate recursively to form a cubic array on the axes of any of the component cubes.

Any attempt to superimpose two of these recursive arrays results in geometric anarchy.

Order is restored however if these combined solids are follow the patterns of Phi stella  and aggregate non recursively.