This next series will explain the equation that gives birth to expanding series. The idea of information arms is not totally new to auT (the last few pictures have shown the information arms) but a detailed discussion of how they work hasn't been given till now.
Information arms create durable information. I could post the entire chapter here, but what would be the fun of that?
This post instead will deal with how we get to information arms in the first place.
In the discussion of the series from one state to the next we just glossed over ct0, accepting it as the solution to F(n)^2^n=2^0 as if that was the applicable equation. That is the equivalent of einstein math (e=mc^2) which is a nice observation, but it doesn't explain "why" e=mc^2. AuT has been doing that for years, but now we're taking a step further back. Go get a beer or a cup of coffee. This doesn't take long to write but may take a while to understand.
Folding suggests that you are putting together rows and this works very well for ct2, photons. It also "sort of works" for space and if you look at the top left hand portion of figure 8 above you can see space folding into a v-shape, but we also know that folding, being a dimensional aspect, doesn't really happen.
Still some way we need these "information arms" which you see as the 1, 2 and 4 sided lines above to build on. These are something special mathematically and they give rise to the entire informational universe.
A hint at the next chapter is that f(n)^2^n suggests that f(n) is the important part, and it is, but is also isn't. Follow me into the rabbit hole.
The idea of random rows is stupid because there is no reason for them, especially in non-dimensional pre-space states.
That these two rows will evolve into a
next carrier 2^1 which is 2 steps that must be taken to achieve linearity from
the non-linear points of information is a given, but how do you make the transition?
Before this linearity there is the 2^0 state which has a single line on which linearity is built in
the form of a history. There is then a
stacking of these single states and then a stacking of the double states and so
on, 2^n, and the F-series are built along these.
The
f-series construction 2^n says that these are built on top of each other in the
fashion indicated which is always consistent from one state to the next.
Here’s where we get some evidence of
what is going on at the quantum level if you have positive and negative
solutions. 0' math from the prior discussion suggests strongly that you have a 0' with both positive and negative states.
The solution, if you accept 0', requires (so far) that
you have an unbalanced equation with 11 and -1 and that the solution is solved
in its respective halves which will then combine to give you the second informational arm. This leaves
open the possibility of unbalanced halves with two negatives and a positive
which, bizarrely enough arrive at the same result. Since this result is carried forward for all
subsequent solutions we get this for the operative equation:
For the first equation (ct0) you basically
have 0’ which hovers between two states, -1 and +1. These are the same as yes/no for reasons that
will be explained in greater detail but if I say I am not not going, then I am
going. If I say, yes, I am going;
effectively two yes answers then yes, I am still saying yet. This totally bizarre logic is mathematically
sound only in our universe, but our universe is the one where we lay out the
math:
This solution -1,0,1- gives the wrong answer. The wrong answer is that you
add the 1,1 and the -1-1 and you get the answer. This doesn’t work because if you solve for
this equation (0,1,1) you get the right answer with F(n)^2^n but if you solve
for -1,0,1, even if you square the two sides separately (-1)^2^0*(1)^2^0 is
still only 1 only 1 and the universe doesn’t expand. So what do we do Mr Genius?
The answer is that we unbalance the equation and use infomation arms, but not yet...that will be part 2!
Isn't this fun? For more detail, order books 1-3 of AuT theory or for a more disjointed version, feel free to read all the prior posts.
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