Let's initially consider a closed-looped superstring of discrete energy permittivity, that is here to be traveling via a d-field. The said superstring is here to be traveling in the relative forward-holmorphic direction, over an evenly-gauged Hamiltonian eigenmetric. Let's consider the space-time-fabric that is here to be at the relative interior of the core-field-density of the string, to be relatively void of first-order point particles that are of the same universal setting as the initially inferred superstring of discrete energy permittvity. Let's next surmise that the holonomic substrate that works to comprise the topology of the said string, to be made-up of a torsional Virtual Bead of first-order point particles (which is here to be as such a bead, with the exception of its partition-based discrepancies), that have here to have come together to work to form the actual entity of the said string of discrete energy permittivity. One may then work to describe the thus inferred holonomic substrate of the topology of the said string, as a torsional compactifited "dimensional slit," that is here to be constantly vibrating -- in one manner or another. If the motion of the said string, that is here to be moving in the respective relative holomorphic direction, when at the vantage-point of its inferred "void," is here to be considered to be of a Real Reimmanian nature, -- then, the Lagrangian of the self-same string, at the Poincare level to the holonomic substrate of its topological stratum, may be considered to be of an Imaginary nature. This is part of why one may often label the relative holomorphic direction of a superstring (which is to the relative "left"), to be in the relative "i" direction. Consequently, the tying of knotted phenomenology -- that is here to come into any sort of a Gliosis-related contact with the said topological-related holonomic substrate of such a said superstring, may be considered to be appertaining to a relationship, that is here to be associated with the nature of (A Constant)*(PI)*(i); -- where "i" is the square root of a negative one.
Sam Roach.
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