Perseus-Pisces Supercluster tells us the Cosmos is Elliptic not Euclidean Chapter 3 #87; ATOM TOTALITY
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From: Archimedes Plutonium on 15 May 2010 13:37 Archimedes Plutonium wrote: > Now according to Jarrett's website: > > --- quoting --- > http://spider.ipac.caltech.edu/staff/jarrett/papers/LSS/ (big snip) > > Now there are other predictions of the Orchard Visibility Problem, but > I have > to work on them. > I do not know if Jarrett would agree with me on this, but I sense that the P-P Supercluster is the central or anchor structure of all his mappings. This is the Perseus-Pisces Supercluster. Now I maybe incorrect by saying that this structure is the longest and narrowing out structure of all the structures? By narrowing out I mean that unlike any other structure, it is the longest structure as a filament or tube and where at one end it is wider than at the other end. And that the narrowing is a measured mathematically consistent narrowing. The Great Walls on the other hand are like "bands" and not narrowing filaments. Now I bring this concern up, because in the Orchard Visibility Problems of Probability theory in Mathematics, the last visible geometry is a long filament, hose like view where it narrows from a wide end to a narrowest end. In other words, the P-P Supercluster is the last viewing of the orchard trees. And the Orchard Visibility Problem of Math also would allow us to determine definitively whether Space is Euclidean flat or whether Space is Elliptic or even Hyperbolic. The Orchard Visibility Problem predicts a long narrowing tube or filament structure as the last viewing structure of the Upper Limit of Viewing. This upper limit is seen as a RING or overall as a sphere and that is what happens when we include all the superstructures and quasars. If the Cosmos were Euclidean or Hyperbolic, the Orchard Viewing would not form a long filament string or hose which is wide at one end and narrows at the other end. If Euclidean then it is difficult to see any such filament because it would be in the line-of-sight that a filament formed and the Upper Limit would be vastly more extended in Euclidean rather than in Elliptic. The formation of filaments like the P-P, at such a smaller distance such as 400 million light years away is a trademark of Elliptic geometry. Hyperbolic geometry would be the darkest and least forming of superstructures. I get the feeling that Jarrett subconsciously recognizes the overriding importance of the P-P Superstructure as a entity that is key to understanding the entire Cosmic mapping. I say this because, apparently, Jarrett often mentions the P-P. The importance of the P-P is that it is the clearest view of the end of the Orchard Visibility Problem, for it is the last view of the trees in which you cannot see any further beyond. And, keep in mind that all the structures beyond the 3rd layer where the P-P lies, are not beyond the 3rd layer but are closer to earth than the P-P superstructure. When I was in High School in the late 1960s, I had learned that the way to tell if the Cosmos was Euclidean, Elliptic, Hyperbolic was to find a large enough Cosmic triangle and see if the summation of angles was equal to, greater than, or less than 180 degrees, respectively. But here today, using probability theory of Orchard Visibility and knowing the data of the P-P Superstructure, that we live in a Elliptic geometry Universe. Archimedes Plutonium http://www.iw.net/~a_plutonium/ whole entire Universe is just one big atom where dots of the electron-dot-cloud are galaxies |