Other classification properties of Stability S-waves
Are other special points of the SWS (e.g., vertices and troughs) classification boundaries? The analysis has shown that the dimensions corresponding to these points are, to some extent, indeed classification boundaries for all systems of the Universe. However, these boundaries separate not so much the objects themselves as the properties of objects within a single class. Let us give some examples.
PLANETS (CLASS #8). We have already described the transition from formless small planets and satellites to spherical planets, which occurs exactly at the lowest point of one of the waves at 7.48 S-axis. Here we see a very sharp boundary, passing through which from left to right we get an infinite jump in symmetry. Note that these properties change within a single class, the class of planets.
NUCLEI OF ATOMS (CLASS #4). We have already considered the boundary between stable particles and atomic nuclei. At the lower point of SWS (-12.8), where nucleons (protons and neutrons) are located, there is a significant change in the properties of the particles of the microcosm.
First, all particles smaller than this size are not as stable as the proton, whose size exactly corresponds to this point.
Secondly, it is from this size that the nuclei of atoms begin to form. The life ages of which, in general, are much longer than those of lighter and smaller particles.
In any case, we can confidently assert the following: at the lowest point of this fragment of the SWS (-12.8), as one moves from left to right, the properties of matter change dramatically. Elementary particles come under the influence of strong interactions, enabling them to form atomic nuclei.The analysis shows that not only the lower, but also the upper points of SWS are the boundaries of changes in properties. However, these changes do not always occur clearly and unambiguously in all slices of the scale hierarchy for all systems. Moreover, careful system analysis has revealed another remarkable characteristic of these points on the S-axis. They occupy a special place in the scale-structural invariant, which will be discussed in the next chapter.