| LIGHT-GEOMETRY undeformed as a determination IDEAL PLOT λm ÷ n-VACUUM |
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INTRODUCTION
The fact that astronomy is a straight line is the trajectory of the light beam. Henri Poincare "On Science" Let''s try to imagine the structure of an ideal substance in terms of idealized laws of modern physics that studies the properties of "elastic vacuum"! Why vacuum? It seems to us that it is in a vacuum there are no flaws that are inherent, in accordance with religious beliefs, physical environment around us! What are the drawbacks? Those who lead every living creature in the material world to his imminent death! Compare that at the time of the prophet Moses, according to the Torah, under the direct guidance of God, the Jewish people committed Exodus from Egypt in the wilderness! Therefore, the vacuum, we can also equate it with a desert! In the Kabbalah of Judaism is the idea that the Lord God, before starting his creation, and created space for himself in this creation, which is called Tsim-Zum! And when he uttered his speech in this space, then there begins to form, the living according to His Word - the Savior, all that He has expressed his will in his speech! And since in this space before His Creation, as if there was no passage of time, these His words ring there permanently, and to this our day! Therefore one must assume that this space has the information structure, which in the Kabbalah of Judaism called "courage"! That''s the ideal structure of this determination and will be discussed in this chapter! MH Gaukhman using the method of algebra of signature, in the book "Emptiness (http://www.alsignat.narod.ru/), leads us to the following: "The velocity of propagation of light signals in a vacuum does not depend on their carrier wavelength. In the language of radio physics, this means that the vacuum has no dispersion properties. This allows assume that all λm ÷ n-vacuums are similar to each other, so it suffices accurately study the properties and structure of only one of them. The following are the foundations of the universal light-geometry suitable to describe the metric-dynamic properties of any of λm ÷ n-vacua. This theory is universal not only in respect of all λm ÷ n-vacua (ie, longitudinal sections of dense "emptiness"), but also for any - cific homogeneous and isotropic continuous media (gases, liquids and solid - Dykh bodies), in which the wave disturbances propagate with constant Noah, the ultimate speed. " |
