10 Examples of "mini-loop" multiplicative factors for distribution divergence for one-dimensional superstrings:
1) 1 "mini-loop" left: (((e^0)/1)/(2.71828128/101)) - (e^~0i)/1 = ~37.15582356 - ~i
2) 11"mini-loops"left:(((e^.1)/11)/2.718281828/101))-(e^~0i)/11 = ~3.733048694-i/11
3) 21"mini-loops"left:(((e^.2)/21)/2.718281828/101))-(e^~0i)/21=~2.16058351-~i/21
4) 31"mini-loops"left:(((e^.3)/31)/2.718281828/101))-(e^~0i)/31=~1.617906958-~i/31
5) 41"mini-loops"left:(((e^.4)/41)/2.718281828/101))-(e^~0i)/41=~1.351950616-~i/41
6) 51"mini-loops"left:(((e^.5/51)/2.718281828/101))-(e^~0i)/51=~1.201168561-~i/51
7) 61"mini-loops"left:(((e^.6/61)/2.718281828/101))-(e^~0i)/61=~1.142863265-~i/61
8) 71"mini-loops"left:(((e^.7/71)/2.718281828/101))-(e^~0i)/71=~1.085163575-~i/71
9) 81"mini-loops"left:(((e^.8/81)/2.718281828/101))-(e^~0i)/81=~1.05123058-~i/81
10)91"mini-loops"left:(((e^.9/91)/2.718281828/101))-(e^~0i)/91=~1.034120293-~i/91
10 Examples of "mini-loop" multiplicative factors for divergence for two-dimensional superstrings
1)~74.331164712-~2i (for one "mini-loop" left)
2)~7.466097388-~2i/11(for eleven "mini-loops"left)
3)~4.322116702-~2i/21(for twenty-one "mini-loops"left)
4)~3.235813916-~2i/31(for 31 "mini-loops"left)
5)~2.703901232-~2i/41(for 41 "mini-loops"left)
6)~2.402337122-~2i/51(for 51 "mini-loops"left)
7)~2.17032715-~2i/71(for 71 "mini-loops"left)
8)~2.10246116-~2i/81(for 81 "mini-loops"left)
9)~2.068240586-~2i/91(for 91 "mini-loops"left)
10)~2.28572653-~2i/61(for 61 "mini-loops"left)
For one-dimensional superstrings: With ninety-one depleted "mini-loops"from full permittivity, the Real Component of its distribution divergence is equal to ~.999950349*10^(-86)meters in the substringular & ~.999950349*3*10^(-78)meters in the globally distinguishable.
This is the one exception for the smallest "mini-loop" distribution divergence.
For one-dimensional superstrings, minimal "mini-loop" distribution divergence # of mini-loops +91 = # of mini-loops that comprise a one-dimensional superstring that has full permittivity.
All two-dimensional superstrings that have an unfulfilled permittivity through those that have 99 "mini-loops" have "mini-loops" that bear more distribution divergence
Mini-Loops of two-dimensional strings that appertain to unfulfilled permittivity of said strings through those that have 99 "mini-loops" bear twice the distribution divergence of those of one-dimensional strings because of the added parameter of space associated with these.
Yet, the distribution divergene of a two-dimensional superstring that bears 100 mini-loops is depleted in one parameter by .999950349 (in one Real Reimmanian sway) while it is euclideanly distributionally more divergent in the other associated parameter sway.
Again, the 100 ML mark is the only case for the prior, for one and two-dimensional strings, when any distributional divergence parameter of a mini-loop sway delves below 10^(-86) meters in the substringular and 3*10^(-78)meters in the globally distinguishable.
Del (C) = The fraction of mini-loops recovered up to 101 "mini-loops." (one mini-loop would involve none-yet-recovered mini-loops).
i(G)=i*10^(-86) in the substringular and i*10^(-78)*3 in the globally distinguishable.
e^(10^(-86))=~e^(0) =~i & e^(3*10^(-78))=~e^(0) = ~i
The Imaginary multiplicative factor is the ghost residue of the "mini-loops" as a steady-state Laplacian during the vibration of these discussed mini-loops of the associated superstrings at BRST.
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