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Well then here is some of his theory: "The octahedron and the cube have the same symmetry group and are dual to each other under the S4 group. The icosahedron and the dodecahedron are dual to each other under the A5 group and the 12-element group T is the tetrahedral group of which the symmetries are inscribed in S2 and is the A4 group. The 24 element octahedral group is denoted as O and is the set of all symmetries inscribed in S2, which is also the symmetry group of the cube since the eight faces of the octahedron correspond to the eight vertices of the cube. The relationship of the finite and infinitesimal groups is key to understanding the symmetry relation of particles, matter, force fields or gauge fields and the structural topology of space, i.e., real, complex, and abstract spaces. We now relate the toroidal topology and the cuboctahedron geometry to current particle physics." You see where this is leading don't you? You're probably going to answer that the toroidal topology and the dodecahedron vertices are essential to the formation of hyperspace interdimensions. But That's not the point of his argument at all. However the following should clear it all up for you. If it doesn't, get back to me straight away. "The U1 can act as the photon (electromagnetic) gauge invariance group and relates to the rotation group SO3. The other U1 scalar is the base for space and time as the compact gauge group of the spin two gravitron. The SU2 group can be associated with weak interactions and 1 2 U  SU is the group representation of the electroweak force. The SU3 groups represent the strong color quark – gluon force or gauge field. [20] Thus we have a topological picture that relates to the unification of the four force fields in the GUT and supersymmetry models. More exactly, the maximal compact space of CO is embedded in S4 or SU(2, 2/1) which yields the 24 element conformal supergravity group. The icosahedron or Klein group yields the set of permutations for S4 permutation group associated with CO. Also in the Georgi and Glashow scheme [24], we can generate SU5 as a 24 element group related to S4 embedded in SU5=SU2 SU3. The key to this approach is the relationship of the finite groups CO and the Lie groups such as the SUn groups. This picture is put forward in detail by Sirag in his significant advancement of fundamental particle physics [20-22]."