At the Poincaire level in relation to a partition along the topological mapping of a superstring, a first-ordered point particle is over to the side of the general topological contour of the said one-dimensional superstring by a distance of the diameter of one first-ordered point particle. So, the said point particle at the mentioned Poincaire-based locus is just to the side of the general linear basis that works to describe the mapping of the Laplacian-based construction of the said one-dimensional superstring's contour. When a one-dimensional superstring is in an arced form, the said partition that is here being considered in this given arbitrary case is just to the side of the normal flow of the said superstring's topological flow. Two-Dimensional superstrings in their respective world-tubes have a minimum of two of such partitions -- a minimum of one that is relatively vertical-based at at least one genus of Poincaire delineation and a minimum of one that is relatively horizontally-based at at least one genus of Poincaire delineation. So, with two-dimensional superstrings, there is at least one partition of which is basically centered at its norm-to-holomoriphic Laplacian-based position during BRST and there is at least one partition of which is basically centered at its norm-to-reverse-holomorophic Laplacian-based position during BRST. The most essential partition of a one-dimensional superstring is roughly in the middle of the locus that here refers to its delineation within the distribution of the mapping of its contour.
One-Dimensional superstrings have a conformal dimension of 2^(1/10^(43), and, two-dimensional superstrings have a conformal dimension of 1+2^(1/10^(43)). I will continue on later! Sam Roach.
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