Some More About "mini-loops"

There are to be up to 191 "mini-loops" localized along the topology of a superstring. From 101 mini-loops along the said topologies up to 191 mini-loops along the said toplogies, the Clifford parameter of the distribution divergence of the said mini-loops is to be maintained. There is no multiplicative factor in the scalar amplitude of this distribution divergence from the existence of 101 of such mini-loops to 191 of such mini-loops.

The first Laplacian instanton of the Kaeler Metric upon the Schotky Interaction reiterates the condition of one mini-loops existence within the Neumman topological boundary of a given superstring by converting Chern-Simmons Hamiltonian momentum within the said locus of the associated mini-loop into a hermitian metric-gauge eigenstate. This rearranges the topology of this said mini-loop into a discrete unit of permittivity by converting Njenhuis norm conditions of that said mini-loop into Real Reimmanian norm conditions to where the limit of virtual mobiaty along the topological surface of the said mini-loop becomes discrete and without spuriousness. (The perturbation of the topologies curvature settles (resettles) into a Real Reimmanian locus whose limits are Ward discrete throughout the topological redistribution of its Laplacian setting.) From the second iteration of the Kaeler-Metric to the 99th iteration of the Kaeler-Metric, the distribution divergencies of the described mini-loops gradually decreases, yet such distribution divergencies bear more scalar amplitude than that of a superstring that has full permittivity. The 100th iteration of the Kaeler-Metric barely (by about .999950349) decreases this scalar distribution divergence for the mini-loops of one-dimensional superstrings, while decreasing the dot product associated parameterization of one of the two spatial parameters that are Neumman Ward associated with the mini-loops of two-dimensional superstrings, while allowing for a euclidean increase in the alterior spatial parameter of the other scalar index involved with the distribution divergence of two-dimensional superstrings. From the 101st iteration of the Kaeler-Metric to the 191st iteration of the Kaeler-Metric, the distribution divergencies of one and two-dimensional strings maintain the same scalar amplitude. This happens over the course of any superstring's Kaeler-Metric as the said superstring regains the permittivity that these need to be the energy that it needs to be so that energy may exist.