If that has a resonance for you maybe you should look into it more. I haven't studied it, I was simply speculating on what it may have been like.
The sun is a powerful source of light and energy but it is a finite source at a limited distance, so we could investigate the consequences of an infinite source at an infinite distance from us. We can even produce a model for a singular and omnipotent source.
Throughout the ages every advanced culture has made some model of the cyclic, self-propagating and self-referential nature of existence. And they have been amazingly confirmational of one to another, if you don't get too puffed up about one over another. They are all, however, symbolic vessels of immanent light held within, directly unnaccessable yet transcendant. Worshipping the vessel or even adornments of the vessel, is to worship an idol.
We literally have made stone or pictorial images of the vessels to be worshipped.
The true mathematician, scientist, philosopher, or theologist would reduce the issue to its purest meaningful definition of unity, which in modern times has been done with the term 'singularity,' the word defining perfect unity.
Mathematicians suggest that Singularities - formal mathematical definitions of Unity - can be modeled by Torus knots.
en.wikipedia.org
The Fourier Transform of existence, is a single pulse of infinite intensity and infinitesimal duration at the start of time - at creation. This suggests that the Big Bang unfolds the modern physicist's model of creation from a singular and intense pulse that may be mathematically equivalent to the definition of the One-God.
"In mathematics, the Fourier transform is an operation that transforms one complex-valued function of a real variable into another. The new function, often called the frequency domain representation of the original function, describes which frequencies are present in the original function. This is in a similar spirit to the way that a chord of music can be described by notes that are being played. In effect, the Fourier transform decomposes a function into oscillatory functions. The Fourier transform is similar to many other operations in mathematics which make up the subject of Fourier analysis. In this specific case, both the domains of the original function and its frequency domain representation are continuous and unbounded. The term Fourier transform can refer to both the frequency domain representation of a function or to the process/formula that "transforms" one function into the other."
en.wikipedia.org |
