July 6th, update information (2).
- kyonissho
- Jul 6
- 2 min read
Article:
No.3105. Ultra-Light Speed and -Gravity.
Update:
from
Fig.1:
I compare φ's [0, 0] with ψ's [0, 0].
φ's circle is in Galois field's spins.
ψ is orthogonal to φs.In case of the right figure, the both i0 and φ's [0, 0] are in the inclination 1. φ's [0, 0] represents any distance, metastasis of ψs are spreading toward +gravity. ψ's extending space makes linearly independent vectors/substances around ψ itself recover relatively same space amount. I.e. if the space around ψ becomes x10 bigger, but ψ's scale is same, then other vectors/substances are required to close ψ.
i0 and [0, 0] are originally same 0, but x^d + y^d ≠ z^d (d ≥ 3), i.e. any two of isometric space can't be merge into a single isometric space at d ≥ 3, the surplus α makes [0, 0]. But if random φs are enough far from ψ, the [i0, [0, 0]] ≈ 0 being recovered as the original 0
+α's [0, 0] (-> ψ's [0, 0]) makes entropy's inflation, in other words, +α's [0, 0] arises itself most far from [i0, [0, 0]] ≈ 0, the inclination 1 realizes (ψ's distance x φ's distance)^(1/2) -> ultra-light speed. Then tiny particles easily skip over surfaces of φ, but large amount e.g. radius 10km spaceship will require the calculation of where φs' surfaces will be.
Remember fig.1's x-axis has ordinal distance of ψ and non-ordinal distance of φ (random distance of φ), photon is progressing [0, 0] of time in real time, time - time = 0 as -time is existing there, photon itself is existence beyond +time.
to
Fig.1:
I compare φ's [0, 0] with ψ's [0, 0].
φ's circle is in Galois field's spins.
ψ is orthogonal to φs.In case of the right figure, the both i0 and φ's [0, 0] are in the inclination 1. φ's [0, 0] represents any distance, metastasis of ψs are spreading toward +gravity. ψ's extending space makes linearly independent vectors/substances around ψ itself recover relatively same space amount. I.e. if the space around ψ becomes x10 bigger, but ψ's scale is same, then other vectors/substances are required to close ψ.
i0 and [0, 0] are originally same 0, but x^d + y^d ≠ z^d (d ≥ 3), i.e. any two of isometric space can't be merge into a single isometric space at d ≥ 3, the surplus α makes [0, 0]. But if random φs are enough far of ordinal ψ, the [i0, [0, 0]] ≈ 0 being recovered as the original 0
+α's [0, 0] (-> ψ's [0, 0]) makes entropy's inflation, in other words, +α's [0, 0] arises itself most far from [i0, [0, 0]] ≈ 0, the inclination 1 realizes (ψ's distance x φ's distance)^(1/2) -> ultra-light speed. Then tiny particles easily skip over surfaces of φ, but large amount e.g. radius 10km spaceship will require the calculation of where φs' surfaces will be.
Remember fig.1's x-axis has any ordinal distance of ψ (having distance) and any non-ordinal distance of φ (random distance of φ), photon is progressing [0, 0] of time in real time, time - time = 0 as -time is existing there, photon itself is existence beyond +time.
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