What are examples for *convex* polytope $P\subset \Bbb R^d,d\ge 3$ for which holds

- $P$ is 2-face transitive (that is, all 2-faces are equivalent under the symmetries of $P$), and
- all 2-faces of $P$ are 4-gons (not necessarily squares, or rectangles).

I know the $d$-cubes, rhombic dodecahedron and rhombic triacontahedron. Are there any others?

I expect other such a polytope, if at all, then only in $d\ge 4$. Maybe a slight modification of a *neighborly cubical polytope* as constructed by Ziegler [here](https://arxiv.org/abs/math/9812033), but as they are, they have two 2-face orbits.