A beam of light will always have a tendency of moving in as much of an optimum manner that it is able to, in so as to move in a straight line, -- unless it is either scattering, or, unless it is being bent by a medium that is other than a vacuum of free space. Light generally quantizes into many beams of light at a time. Also, light tends to move in the direction of least time. Let's say that a beam of visible white light is here to travel down from the sky. Let's say that the beam of light that is here to be given, is to strike the top of a trampoline. (The stretchable part.) When the light beam given was here to be traveling toward the said trampoline, the given light existed as an orbifold eigenset, that had a Clifford differentiation that was of a euclidean nature. The light beam existed as an orbifold eigenset, in part, because the said beam was a manifold of magnetism that also had an electric field that is directly associated with it. Any manifold of magnetism, is a structure that is here to work to involve one or more orbifold eigensets. Any orbifold eigenset that differentiates in either size and/or shape, has a Clifford differentiation associated with it. When an orbifold eigenset is differentating in either its size and/or shape -- in a non-accelerated and smooth manner that is hermitian, then, the orbfiold eigenset given here -- is said to have a Clifford differentiation, that is here to tend to be completely of a euclidean nature. The given beam of white light in this case, is an orbifold eigenset that is non-accelerated and smooth and hermitian, -- and is thereby completely euclidean, until the beam of light is to strike the said trampoline in a Gliosis-based manner. Once that the given light beam is to strike the given trampoline, the beam of light is then to scatter in a Calabi-Yau interaction -- in which the scattered light is to then be both absorbed as heat, and refracted by the material of the trampoline in general as well. Scattered light exists as a Dirac Clifford differentiation. An example of a Dirac Clifford differentiation, is when an orbifold eigenset of electromagnetic energy -- is here to differentiate in an accelerated manner, that is both Chern-Simons and unsmooth -- as it is traveling along the Hamiltonian operand, that is here to be transmitted along the traversal of its Lagrangian-based path over time.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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