In my last post I presented a rather cluttered model of what the unit sphere of reflective gravity looks like. In it, I showed the basic geometry of fitting two bikau quadrilaterals with a unit sphere. While not wrong, the presence of circles on the spherical surface and the lack of relating the shape to physical phenomena probably made the post hard to understand.
In today’s post I develop this preliminary model into a genuine spacetime origami. “What is a spacetime origami?”, you might ask. Well, an origami, made of folded rectangles, where the folded shape is made of triangles, whose sides are very peculiar. One triangle of the quadrilateral is comprised of 1° a space vector, depicting the location of a molecule at the present; 2° a spacetime vector, depicting the future path of one end of the molecule in space over time and 3° a spacetime diagonal, connecting the two sides of the molecules in space over time. The other triangle of the quadrilateral is comprised of 1° a space vector, depicting the location of a molecule in the future; 2° a spacetime vector, depicting the past path of one end of the future molecule in space over time and 3° a spacetime diagonal, connecting the two sides of the molecules in space over time.
And here is how it looks like:
I’ve included four spheres into the model depicting two molecules at the present of the model. I haven’t included four additional spheres depicting the same two molecules at the future of the model. That is why the model seems to have vectors that don’t seem to depict anything.
In fact, the model shows additional data, apart from what I’ve told thus far. However, I think this is enough for today.
If I’m not mistaken, the above model is very close to the final truth. However, I’ve thought this way before and then got stuck. The only way to know whether this is the final truth is to follow the mathematics to its logical conclusion. Let’s hope for the best.
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