¶ Brouwer’s Theorem
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Index Entry
Brouwer’s mathematical theorem states that if any number of points on a plane are stirred around an x amount, on cessation of the stirring, one of the points may be shown to have been the center point of the stirring-- and never to have moved in relation to the others. In order to be ‘stirred,’ these points must have multidimensionality and the cluster of stirred points must have obverse and reverse sides. Therefore, the obverse-reverse sides must each have visible points that were the centers of the stirring and, short though the distance between the obverse-reverse surface neutral center points, the short line between the obverse-reverse visible central points’ obverse-reverse poles constitutes a neutral axis of the system of points and isolates two points for axial functioning in every point system swarm. Pauli’s exclusion principle verifies that each of the stirred points in Brouwer’s theorem and the point which did not move have their inherently separate counterpart points which discloses both the neutral axis formed by the two points that do not move and the obverse and reverse sets of moving points. Thus we discover that even a point’s angular topological difference between its definiteness and its finiteness is 720°
¶ Citations
- OMNIDIRECTIONAL HALO, p.148, 1960
