¶ Brouwer’s Theorem
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Index Entry
Brouwer’s Theorem:
"Another very powerful mathematician was Brouwer. His theorem demonstrates that if a number of points on a plane are stirred around, it will be found after all the stirring that one of the points did not move relative to all the others. One point is always the center of the total movement of all the points. but the mathematicians oversimplified the planar concept. In synergetics the plane has to be the surface of a system that not only has insideness and outsideness but also has an obverse and re-exterior. Therefore, in view of Brouwer, there must also always be another point on the opposite side of the system stirring that also does not move.
“Every fluidly bestirred system has two opposed polar points that do not move. These two polar points identify the system’s neutral axis.”
