I have often mentioned as to what Gaussian Transformations are, in leu of what it means to when a discrete quantum of energy is Gliosis to the Kahler-Metric. Here is the difference between what each of these two ideas are, as I have tried to describe. Gaussian Transformations refer to the condition of Hamiltonian operators of space -- relating to the existence of other Hamiltonian operators of space -- in so as to make room for the multiplicit Hamiltonian operators of space, so that spatial eigenstates may be able to freely move around enough, in order for spatial eigenstates to be able to both persist and exist over time. Discrete quanta of energy being Gliosis to the Kahler-Metric, refers to that general activity that is to happen -- in order for those fractals of discrete energy to be re-attained by substringular eigenstates of energy, so that discrete energy may both persist and exist over time. What I have just mentioned as the general "activity" of Gaussian Transformations is necessary, because space needs to often be "sturdied-up" in order for Hamiltonian operators of space to be able to viably relate to each other. Furthermore, what I have just mentioned as the general activity of superstrings being Gliosis to the Kahler-Metric -- is necessary, because even though discrete energy is theoretically fully efficient, it actually is extremely close, yet not literally, 100 percent efficient.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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