Way off topic, on behalf of physical evidence of the dimension of universe:
In an n-dimensional universe any radiation that propagates under common circumstances: 1. Conservation of energy 2. Constant speed 3. Isotropy (same intensity in all directions) satisfies: At a distance d from the source, the energy emitted at a moment d/c is contained in a n-dimensional hypersphere. Therefore, the energy measured at a distance d is = constant*intensity/d^(n-1) where n is the dimension of universe. All propagation laws (including gravity) have the form: constant*intensity/d^2 That is: n - 1 = 2 --> n = 3 Any coherent higher dimension model should explain which of the three circumstances is not met, how and why and without making any particular dimension different from the others. Something a lot more complicated than just drawing "easy conclusions" from analytic geometry. Jacques. _______________________________________________ computer-go mailing list [email protected] http://www.computer-go.org/mailman/listinfo/computer-go/
