¶ Topology: Synergetics & Eulerian (3)
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Index Entry
Now somebody did not realize that in putting the hole through it you had removed the poles, the axis. Two points must always be involved in every system.
Another very powerful mathematician was Brouwer. In his theorem, if we have a number of points and we continually mix them up we find that after all the stirring one of them didn’t move relative to the others. Each one is always in the center of the total movement, each of those points.
But the mathematicians oversimplified the plane. In synergetics the plane has to be the surface of a system that is obverse and inverse. Therefore, there must also be another point on the other side that does not move. Every system has two points that do not move. The system always has a neutral axis. Every object has a neutral axis, two points that serve as the poles of the system. Synergetics extracts those two points for its topological inventorying.
Every system has two vertexes which must be a sign, a function, of being an axis of the system. Synergetics has the axis in reality what physics has as the spin and quanta in theory.
