I’ve been struggling with the final stages of the Theory of Everything for exactly a month, with only a single post during this time. The reason for this is that the theory is so ready that all of the flaws are immediately obvious, but the final problems are very opaque. As Donald Rumsfeld would say, they are unknown unknowns. I’ve been trying to fit all the pieces together for weeks now, and each time I’ve felt that I’ve solved the final puzzle, applying the idea to the reflection model didn’t produce a logical outcome.
The largest problem I had was in making the model only produce true reflections. That is, I could make my model be geometrically accurate (at least mostly), but the shapes that I produced looked off. I hoped that just as long as I could make them perfectly accurate, the shapes would ‘magically’ become symmetrical, as would be expected of reflection.
The only way that I knew how to solve this problem was to just play around with the reflection model until it revealed its secrets. And yesterday things started unraveling. The first hint was that my model seemed to indicate that the elementary particles of energy (kaus) would be jumping from one circular plane of reflection to another in the way I expected only half of the time. Half of the reflections didn’t seem to follow the same logic. At first, I was toying around with a rather convoluted way of splitting half of these reflections into two hemispheres that are unconnected to each other, but connected to the circular planes of reflections of the neighboring unit spheres of flyby. The exact reason why I did this is rather hard to explain but relates to the formation of a symmetrical flyby path.
However, when I started playing with this idea, it no longer seemed to fit with the idea of ‘rotating hinges’, or more specifically the idea that the hinge for neighboring unit spheres are at a 90-degree angle to each other. So, I decided to take a long walk and mull over the problem. At some point during the walk, I had the idea “what if the hinge is permanent?” That is; what if all the neighboring unit spheres of reflection have a hinge that opens in the same direction? This would potentially solve a lot of problems. The only problem I had at that point was that I was walking along the Vanajavesi, approaching the Häme Castle, meaning that I would have still about an hour before I could get to my computer to check if the idea had any major flaws.
The good thing was that the idea was so simple that even with my mild aphantasia (level 4 in the link), I was able to turn the idea into simple shapes. The key idea was the introduction of a ‘flyby toruses’ parallel to the two circular planes of reflection. The kaus on a flyby torus would be reflected from a kau on a hinged circular plane but would always remain on the same side of the hinge. Or being reflected from neighboring flyby toruses with identical colors. Converted into a model, the idea looks like this:
At first glance, the model does appear pretty much perfect. However, I’ve been playing around with ideas on the elementary particle of energy for almost exactly three years and I’ve been prematurely hyped up for enough times to be wary of proclaiming this to be the final truth. Any idea can be converted into a model, but almost always the first attempts are simplifications, not taking everything into account.
I guess I have to emphasize at this point that if this idea is correct, the older idea must have been incorrect. The older idea stated that some kaus can pass through circular planes of reflection without being reflected. This idea would have solved some problems, but ultimately it seemed to have been a dead end. So, what makes me so confident that this idea isn’t a dead end either? The honest answer is that I’m not 100 % confident. This idea is very promising, but I won’t be losing sleep if this is proven wrong. Only time and mathematics will tell whether today’s idea is the bee's knees.
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