TURBULENCE THEORY
By turbulences, i.e., metrical distortions with orthonormal differential and the mathematical structure of the general group of frame transformations, the theory of relativity is modified such that the semi-Riemannian geodesic theory and Lorentz contraction are preserved, but the relativity of equal times is abandoned. The central key is, that a physical system which moves relative to the vacuum background is embedded in the action-space block manifold by a Lorentz turbulence and time is associated to the proper time, respectively, semi-Riemannian arc length, which is for all observers a universal Newtonian time. Thereby, action as a self standing parameter, like collapse action of molecular systems, is relatively Lorentz contracted but not time itself. This theory allows a natural general equivalence principle for accelerated motion and is ready to go for the nonlocal and instantaneous character of quantum collapse dynamics. Moreover, by the demand of general coordinate invariance, a regularity theory for hydrodynamics is proposed.
theory of relativity, semi-Riemannian geometry, general transformation groups, metrical distortions, turbulence, invariant hydrodynamical regularity.