What is a line? A line is a curvature that goes straight in whichever direction you consider it going in. If the line were ideal and not a segment, then it would go infinitely in either direction. Since the universe that we are dealing with is limited, it is finite. Anything that is finite as a discrete size. Therefore, any line that is physical is limited, and thereby finite. Thus, there are no physical lines with infinite length. This means that there is actually no ideal line. Lines are segments.
In our previous course, we discussed that phenomena is constantly in flux. Organization allows life, and life proves a relative degree of order. In order for order to proceed from physical flux and reassociations, there must be a set of physical points that are flush for every eigenstate of encasement. Each point particle of such a flush array must have a counterpart that allows each to lock in as a stabilized action. Otherwise, the flush orientation would just be a transient coincidental array and THAT would not happen. The counterpart would associate here due to an attraction due to wave supplementation. The flush array of Real points mentioned here is an example of a one-dimensional string. Its counterpart is the Fock Space association of the string.
Strings are physical. These are relatively optimum and necessarily, yet these are not ideal. Strings are small, yet these also have thickness. These are straight, yet these are not infinite in flushness. Strings are temporary per iteration, yet these hold near position for a slightly longer metric than the adjacent point commutators, although these subsequently speed up for a brief while.
Every string in the substringular has segments that make it up. Each of these segments is a separation from space as it normally is, and I call these “partitions.” Each of these “partitions” encodes for a string in the realm that we would detect them. Each of these globally distinguishable strings has one aberration from flushness. The aberration from the flushness of the globally distinguishable strings is equal to the thickness of one point particle. In the substringular, the partition is smaller than the string that it encodes for. The strings in the substringular keep flush top to bottom in the world-tube/general world-sheet that these iterate in.
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