In today’s post I make the surprising discovery that reflection of energy causes the expansion of spacetime. This relates to the hinged reflection shape of my last post. I was about to say something pithy about how all of this relates to current theories of the expansion of the universe. However, as I have almost no real knowledge of that topic, I’ll just talk about the real discovery that I made.
And what is it that I found this time? First of all, I realized that the unit cell of reflection can be better understood as the unit sphere of reflection (green transparent sphere in the model below). That is, all of the elementary particles of energy (kaus/dots) can be fitted inside, or on the surface of a sphere. With the angle separation, θ, of the two circular planes of reflection being zero, the diameter of this sphere of reflection is √12r, where r is the radius of a kau (and 2r its diameter). However, when θ > 0, the radius of the diameter of the sphere of reflection is increased to √12r/cos θ. When this sphere of reflection opens up, it leads to a cascade of effects, a part of which I’ve illustrated with tangential arrows in the rotating 3D model below.
Reflection influences the location of all the 15 points (blue for reflection, yellow for grazing and green for geometrical aids). In principle it should be rather easy to determine the altered location of each point after the easiest points have been discovered. A bit like in Sudoku.
If I’m able to do this, this should be the final mathematical nail to the coffin of the probabilistic worldview that we’ve been living for the past hundred years of quantum mechanics. That isn’t to say that the world becomes less probabilistic in practice. The only way to derive full determinism from this model might be to know the location of all the kaus in these ever moving and reflecting structures. And this realization doesn’t offer any quick relief to this problem. So, with this model, the world becomes a deterministic place in principle, but remains probabilistic in practice, a least for a while still.
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