NLC-a view of g-space 4 of x-Building from nothing part 2

If you are wondering how the level of complexity can grow from the F-series growth in the prior post, let me explain it in terms of the original language.  Everything happens at once, including each of these building F-series which means they all are a part of this universe, each affect the others to yield complexity.
You have a box, interacting with two boxes, interacting with three boxes and so on and so forth until you have these multiple universes which exist one right after and adjacent and interacting with each other.
You can have a fixed universe in this way, while you have an infinite universe growing past it to create a new view of the universe based on this method of building.
Our universe remains fixed, but these other universes continue even though growth to infinity and beyond happens, but it happens all at once.  You wish to deny this, but it is possible because the infinite growth is a part of defining the universe by a an equation instead of growth as we understand it.
This means that our "fixed data" universe, will be next to and affect the next out universe while being fixed in connection with all lower states.
The formulation for this will have to wait for another blog as we lay the groundwork, but the idea is that each spiral can be seen as coming off of the adjacent spiral just as compression occurs at intersection, so too does compression apply to the growth of adjacent universes of set information which combine to form more and more complex, larger, exponentially, informational universes, but each coming to a fully compressed state.
Compression allows for multiple points of one type to be built off of data of another type at higher compression states.

Applying this concept to the universe as a whole:you begin even with just a handful of different universes with an incredibly rich and connected stacked universe.  Looking at the right hand side of the picture you see a single spiral (box) universe intersecting on the spiral immediately before a two spiral (2 boxes defined by increasing F-series spirals) with a single spiral universe off of it followed by a three spiral universe. The left side shows how a spiral off a spiral might be portrayed from the algorithm mathematically and the final bottom left portion of the figure shows how relative to a "relative time" generated by an "offset intersecting spiral" off of two spirals which would allow for time dilation.  Note that each of these universes would be gradually added to even larger universes since this merely represents around one dozen (I'll go in and count them for you later if you ask me to) individual data points out of a universe with 10^100+ data points at any quantum moment.