Mucube

The mucube or muc, short for multiple cube, is one of the three regular skew apeirohedra in Euclidean 3-space. It's an infinite polyhedron that consists solely of squares, with 6 meeting at each vertex.

The mucube is based on the cubic honeycomb. Its faces are a subset of the faces of the cubic honeycomb, but with some removed (square holes) such that each set of coplanar faces turns into a checkerboard pattern. In fact, when the cubic honeycomb is being given as x4o3o4x, then the here solely being used squares are the ones of type x . . x.

It can also be formed as a modwrap of the order-6 square tiling by identifying every 4th vertex on each hole.

Vertex coordinates
Coordinates for the vertices of a mucube with unit edge length are given by $(i, j, k)$, where $i$, $j$, $k$ take on any integer value.

Derivatives

 * Halved mucube