A one-dimensional superstring of discrete energy permittivity has anywhere from one to 3*10^8 partitions -- as I have described in prior posts what I mean by partitions.
A two-dimensional superstring of discrete energy permittivity has anywhere from two to 6*10^8 partitions -- as I have described in prior posts what I mean by partitions.
When a one-dimensional superstring of discrete energy permittivity is fully contracted, it has one partition that is localized in the general center of the topological Ward Neumman bounds of the Gliossi-based field of the said superstring. If the Lorentz-Four-Contraction is 0, then, the said superstring has 3*10^8 partitions that are evenly localized along the topological Wared Neumman bound of the Gliossi-based field of the said superstring. So, the number -- to the integer-based digit -- that works to describe the degree of Lorentz-Four-Contraction of a one-dimensional superstring of discrete energy permittivity is the inverse of the number of partitions that exist along the topological Ward Neumman bounds of any given arbitrary Gliossi-based field that directly appertains to the mapping of the Laplacian-based surface area of the said given arbitrary superstring.
With two-dimensional superstrings of discrete energy permittivity, the physically-based behavior is similar, except that this here works to involve twice as many partitions -- as I have described in prior posts what I mean by partitions.
If a one-dimensional superstrings that I have described in this post has only one partition, then, this partition is in the general center of the superstring as I have described. Yet, if a two-dimensional superstrings that I have described in this post has its minimal of two of such partitions, then, these said partitions will exist at the center of the relative norm-to-holomorphic end of the said superstrings & also at the center of the relative norm-to-reverse-holomorphic end of the said superstring. Superstrings that go at the speed of light will also have minimal-number-based partitions localized along their topological stratum. I will continue with the twelvth session of course 13 later! Sincerely, Samuel David Roach.
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