RigelBR7
He/Him- 140
- 31
Hello, I came to review the "worlds within worlds" tiering involved in fiction. Read my argument below.
## Worlds within worlds, recursion and infinite regression in cosmologies of works.
# High 1-B to High 1-B+. Why? — Because there is no way for there to be two 3D-(XYZ) axes in the same concept of space. Geometric axes and vectors of geometric space are not repeated, each one is unique, perpendicular and orthogonal to each other, infinitely so.
EX: 177D cannot exist without 176D and so on. There is not just one 177D axis, it is a combination of 176 additional perpendicular and orthogonal axes, forming a 177D geometric space.
The geometric dimensions of space and mathematics are quantitative in themselves.
EX2: An infinitely uncountable aligned point (Aleph¹) forms a 1D line. Infinite overlapping and perpendicular/orthogonal lines, in an uncountably infinite way (Aleph¹), form an infinite 2D plane. Countless infinities (Aleph¹) 2D infinitesimal planes and slices form a 3D cube, and so on Ad Infinitum in volume and transcendence, even this in transfinite cardinalities.
Therefore worlds within worlds and even infinite regression, in an Ad Infinitum (without limits) = High 1-B, up to High 1-B+.
An endless quantitative transcendence that extends to possibly the transfinite, in special and more elaborate cases.
## Worlds within worlds, recursion and infinite regression in cosmologies of works.
# High 1-B to High 1-B+. Why? — Because there is no way for there to be two 3D-(XYZ) axes in the same concept of space. Geometric axes and vectors of geometric space are not repeated, each one is unique, perpendicular and orthogonal to each other, infinitely so.
EX: 177D cannot exist without 176D and so on. There is not just one 177D axis, it is a combination of 176 additional perpendicular and orthogonal axes, forming a 177D geometric space.
The geometric dimensions of space and mathematics are quantitative in themselves.
EX2: An infinitely uncountable aligned point (Aleph¹) forms a 1D line. Infinite overlapping and perpendicular/orthogonal lines, in an uncountably infinite way (Aleph¹), form an infinite 2D plane. Countless infinities (Aleph¹) 2D infinitesimal planes and slices form a 3D cube, and so on Ad Infinitum in volume and transcendence, even this in transfinite cardinalities.
Therefore worlds within worlds and even infinite regression, in an Ad Infinitum (without limits) = High 1-B, up to High 1-B+.
An endless quantitative transcendence that extends to possibly the transfinite, in special and more elaborate cases.