Platonic solids in Z3

Abstract

Extending previous results on a characterization of all equilateral triangle in space having vertices with integer coordinates ("in Z3"), we look at the problem of characterizing all regular polyhedra (Platonic Solids) with the same property. To summarize, we show first that there is no regular icosahedron/ dodecahedron in Z3. On the other hand, there is a finite (6 or 12) class of regular tetrahedra in Z3, associated naturally to each nontrivial solution (a,b,c,d) of the Diophantine equation a2+b2+c2=3d2 and for every nontrivial integer solution (m,n,k) of the equation m2-mn+n2=k2. Every regular tetrahedron in Z3 belongs, up to an integer translation and/or rotation, to one of these classes. We then show that each such tetrahedron can be completed to a cube with integer coordinates. The study of regular octahedra is reduced to the cube case via the duality between the two. This work allows one to basically give a description the orthogonal group O(3, Q) in terms of the seven integer parameters satisfying the two relations mentioned above.