Its us and we are approachingthe door way through the center of our galaxy, and beyond,cant wait....love honour truth and all knowing of all there is and has been....never to look back but only forward...
Fig. 17. The 120-cell Coxeter four dimensional polytop upon which the M4 hyperbolic manifold with χ(M4) = 26 is based. The figure shows for the first time the exact geometrical connectivity upon which E(∞) space is based. The figure naturally does not show the transfinite point which must be superimposed on the figure to produce E(∞). The E-infinity spacetime may be regarded as a fuzzy version of M4 which is homomorphic to it. We may note that the symmetry group of this Coxeter “scaffolding” of our E-infinity space is identical to the Schläfli symmetry group {5, 3, 3} and is given by g5,3,3 = (120)2 = 14,400 which is the number of congruent ortho-schemes of volume 13π2/5400 = (128.3048572)/5400 = 0.023760158. We note also the proximity of 13π2 = 128.3 to . Finally we may give characteristic numbers of the polytop in this case which are: N0 = 600, N1 = 1200, N2 = 720 and N3 = 120.
Its us and we are approachingthe door way through the center of our galaxy, and beyond,cant wait....love honour truth and all knowing of all there is and has been....never to look back but only forward...
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Fig. 17. The 120-cell Coxeter four dimensional polytop upon which the M4 hyperbolic manifold with χ(M4) = 26 is based. The figure shows for the first time the exact geometrical connectivity upon which E(∞) space is based. The figure naturally does not show the transfinite point which must be superimposed on the figure to produce E(∞). The E-infinity spacetime may be regarded as a fuzzy version of M4 which is homomorphic to it. We may note that the symmetry group of this Coxeter “scaffolding” of our E-infinity space is identical to the Schläfli symmetry group {5, 3, 3} and is given by g5,3,3 = (120)2 = 14,400 which is the number of congruent ortho-schemes of volume 13π2/5400 = (128.3048572)/5400 = 0.023760158. We note also the proximity of 13π2 = 128.3 to . Finally we may give characteristic numbers of the polytop in this case which are: N0 = 600, N1 = 1200, N2 = 720 and N3 = 120.
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