| reflected past
Why does light always travel away from its source? This question arose only when the point of view is globalized. A local perspective of the same light’s journey, theoretically, indicates that it does return to its source within the Möbius domain of spacetime curvature. However, keep in mind that one Möbius domain is necessarily independent of spacetime extension or temporal duration. Its topology is the same at all time whether viewed in the small or in the large. When light reached its first complete journey, it appeared as its own reflected image. Its left is its right. What it does with the right hand must now be accomplished with the left hand, vice versa. For a human being, the right brain is transformed mysteriously into the left brain. All thinking of relative future is now memory of relative past. All visionary bright ideas changed into forgotten events of reflected past.
In order for light to revert to its original right-left symmetry, it must now complete one more journey. Therefore, two completed journeys are necessary for light to fulfill its self identity. A physical demonstration can be setup using the internal reflections of mirrors lined up along the sides of regular polygons.
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Time independence: [∂E(g)]²=[∂F(a)×∂r(a)]·[∂F(b)×∂r(b)] and Mass independence: ¶a(t)·¶r(t)=c²
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Linear Mode
