Zitat:
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4. Complex Eight Space and Nonlocal Anticipatory Systems
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Hier fasst Rauscher nunaechst zusammen, welchen Anforderungen eine physikalische Theorie genuegen sollte.
Zitat:
Within the context of a fundamental observation and theoretical formalism of nonlocality and anticipation, such a theory must be consistent with the main body of the principles of physics. The major universal principles are used to determine the structure and nature of physical laws and act as constraints on physical phenomena. These are Poincairé invariance and its corollary, Lorentz invariance (which expresses the space-time independence of scientific laws in different frames of reference), analyticity (which is a general statement of causality conditions in the complex space), and unitarity (which can be related to the conservation of physical quantities such as energy and momentum).
These principles apply to microscopic as well as macroscopic phenomena.
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Dass der Vefasser der Theorie einen geeigneten Bekanntenskreis aufweisen muss hat sie leider vergessen.
Zitat:
It has been mathematically demonstrated that the equations of Newton, Maxwell, Einstein, and Schrödinger are consistent with the eight-dimensional complex space described here [12-14,20,30-34]. In addition, nondispersive solitary wave solutions are obtained for the complex eight space Schrödinger equation [21].
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Klingt doch recht vielversprechend.
Zitat:
The least number of dimensions that has the property of nonlocality and that is consistent with Poincairé invariance or Lorentz invariance is eight dimensions.
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Zitat:
Both special and general relativistic forms of the complex eight space have been formulated and examined in applications [11,13,15].
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[11] Ramon, C. & Rauscher, E.A. (1980) Superluminal transformations in complex Minkowski spaces, LBL Report 9752 ; Foundations of Physics (1980) 10, 661.
[13] Newman, E.T. (1976) H-space and its properties, General Relativity and Gravitation, 7, 107-111.
[15] Haramein, N. & Rauscher, E.A. (2008) Complex Minkowski space formalism of the Penrose twistor and the spinor calculus, in D. Dubois
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Zitat:
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The complex eight space formalism not only yields a mathematical description of nonlocality, but the complexified Schrödinger formalism gives a detailed picture of the quantum nonlocality that is consistent with the statistical nature of the quantum theory, but is also consistent with the formalism of relativity.
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Im folgenden geht Rauscher genauer auf die Metrik des 8 D Raumes ein. Fuer mich waere die Frage von Interesse ob Rauscher die Imaginaerteile als Funktionen z.B. der Masse und Entropie betrachtet.
Ich hatte erwartet, dass diese Anteile mit der Dekohaerenz verschwinden. Dem scheint aber nicht so.
Zunaechst zeigt Rauscher, da die imaginaeren Anteile bei einer Betragsbildung natuerlich nicht verschwinden.
Im folgenden erklaert sie die Nichtlokalitaet ueber den 8 D Raum.
Teil 3 folgt