What works to comprise the core-field-density of superstrings, is primarily a combination of the following: 1) The Hodge-Index as to the number of second-ordered point particles that work to comprise an increment of the holonomic substrate of a given arbitrary quantum of the said core-field-density. 2) The genus of the stratum of the topological contour of a holonomic substrate, that works to form a quantum of core-field-density. 3) The Hodge-Index of any possible directly corresponding point commutators, that work to help comprise the said quantum of core-field-density. (Point commutators are a tense of first-ordered point particles, at the substringular level.) 4) Both the tense of the transversal, the radial, and the spin-orbital momenta-based indices -- that are propagated by the said core-field-density. 5) The piece-wise continuous Laplacian-based mapping -- that is here directly related to both the degree and the manner of the compactification of the said core-field-density. 6) Both the existence and the activity of the ghost-based indices that act in a Yakawa if not in a Gliossi-based manner, upon a said core-field-density. &7) Both the manner and the activity of the Lagrangian-based paths -- that work to inter-relate the Hamiltonian-based operands, that allow for the needed interactions of one given arbitrary and respective quantum of core-field-density -- to another of such Hamiltonian-based operands.
I will continue with the suspense later! To Be Continued! Sincerely, Sam Roach.
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