Interesting...
There is infinite numbers between infinitesimal point x1 and the next infinitesimal point x2<x1 so that x1-x2 --> infinitesimal. This is because infinitesimal, like infinity is not a number, but a generator of the field of respective null spaces for respective rings.
For example, in 1D if a is the infinity generators of +Z, and b is the infinity generator of +R , and we pick an element in a, a*, as the most infinitesimal point on the number line of a, and b* likewise, we couldn't compute a* - b*, because it could be any form of
c( a * - b *),
with c an integer. And, c has to be nonzero if these elements are abelian, which is what we need. Or, rather, want it. Otherwise, we just get a linearly dependent answer from the operation, which just suggests they are part of the same set/family. And, it implies symmetry. Also, the trivial case c=0 is also linearly dependence, and we choose zero as a limit infinitesimal so that all elements are greater than zero. (I use this because 0 is the limit that 1/x approaches as x gets incredibly large from the left or right.)
The conclusion would be if two elements in respective chosen spaces are linearly independent, and therefore not in the same set/family, then there exists no element k = c( a * - b *) = 0. If the elements are linearly dependent, then there will exist an element k = 0. But, this suggests they are in the same family. So, that is another way of saying in the same "reference frames," or more specifically, same vector space.
So, just like the geometric straight line only existing in the same reference frame on the most infinitesimal level, the algebraic straight line only exists if two points are on the same number line, or ring. For 2D, it must be the same plane, and so on.
And so, one could philosophically akin one's own life journey as "straight," or righteous in one's own reference frame, or world/ego.
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