Hello Again, this is Samuel Roach here! I am here today to discuss with you more about Compactification and Yakawa Couplings!
What makes a wave a color? An eigenstate is where a wave and a thing become one thing. So, ths reality that makes a wave a thing is the same reality that gives an eigenstate a value. Light is composed of waves. Waves of energy. This energy is composed of superstrings. These strings are composed of first-ordered point particles. The direct waves of light that we observe are in the globally distinguishable, and are waves of energy that are trajectories of Planck linear energy (h) and Planck radial energy (hbars). HBars are the smallest amount of energy that is still what we would term of as energy. An hbar is on the order of a globally distinguishable superstring. The globally distinguishable that we generally come in contact with is one of many parallel universes that exist in the substringular. The Basis of Light is a substringular phenomena. Bases of Light vibrate in a resonant vibration, yet with a brevity of sub-metric that keeps this from shattering. The just described resonant vibration happens at an indistinguishably different pulse, and in a framework of shape that only varies through time (the integration of the group iterations of instantons) via the given tori-sector-ranges with a time-related association that is either: 1) Equally forward and backward moving; 2) Mostly forward and less backward moving; Or, 3) Mostly backward and less forward moving. The activity of these Bases causes differential geometries to recycle so that the covariant exchange of substringular field, or, in other words, so that the covariant exchange of mini-string that allows for the flow of the kinematic differentiation of topology to allow for the maintainance of homotopy, may occur. This should be enough food for thought now! I will continue with the suspense later. Sincerely, Sam.
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