The Duality of Time Theory, that results from the Single Monad Model of the Cosmos, explains how physical multiplicity is emerging from absolute (metaphysical) Oneness, at every instance of our normal time! This leads to the Ultimate Symmetry of space and its dynamic formation and breaking into the physical and psychical (supersymmetrical) creations, in orthogonal time directions. General Relativity and Quantum Mechanics are complementary consequences of the Duality of Time Theory, and all the fundamental interactions become properties of the new granular complex-time geometry, at diifferent dimensions. - => Conference Talk [Detailed Presentation]
... een all frames of reference, and this defines a set of symmetrical transformations called poincar group. The invariance of physics laws, under arbitrary differentiable coordinate transformat ...
... r inertial frame, such that the laws remain unchanged, is the symmetry group called after poincar group. As we shall discuss further in section III.1.1, the theory of Special Relativity asse ...
... the same value in all frames of reference, so this forms a symmetry that is described by poincar group, which is the symmetry group of Special Relativity. Symmetry can also be observed with ...
... asi-particles in condensed matter physics. Because it is based on Special Relativity, the poincar group is the basic symmetry of Quantum Field Theory. This means that the laws of relativity ...
... etermined by whether it transforms in a right-handed or left-handed representation of the poincar group. Massless particles are considered right-handed if the direction of spin is the same a ...
... e more familiar symmetries of Quantum Field Theory. These symmetries are grouped into the poincar group, since internal symmetries and the Coleman Mandula theorem showed that under certain a ...
... losely related to time differences, which produces new groups called Lorentzian group and poincar group, that will be described further in section III.1.1. The Galilean space-time and Minkow ...
... rix Lie group that preserves the quadratic form on : . Lorentz group is a subgroup of the poincar group, the group of all isometries of Minkowski space-time, because Lorentz transformations ...
... ar symmetrical situations. There is no unique group for General Relativity similar to the poincar group of Special Relativity. When Einstein combined the equivalence principle with the other ...
... Minkowski metric possesses a global Lorentz symmetry, and the full isometry group is the poincar group which is an extension of the Lorentz group that also includes translations. Similarly, ...
... Space Transcendence Read this short concise exploration of the Duality of Time Postulate: DoT: The Duality of Time Postulate and Its Consequences on General Relativity and Quantum Mechanics ...
... Space Transcendence Read this short concise exploration of the Duality of Time Postulate: DoT: The Duality of Time Postulate and Its Consequences on General Relativity and Quantum Mechanics ...
I have no doubt that this is the most significant discovery in the history of mathematics, physics and philosophy, ever!
By revealing the mystery of the connection between discreteness and contintuity, this novel understanding of the complex (time-time) geometry, will cause a paradigm shift in our knowledge of the fundamental nature of the cosmos and its corporeal and incorporeal structures.
Enjoy reading...
Mohamed Haj Yousef
Check this detailed video presentation on "Deriving the Principles of Special, General and Quantum Relativity Based on the Single Monad Model Cosmos and Duality of Time Theory".
Download the Book "DOT: The Duality of Time Postulate and Its Consequences on General Relativity and Quantum Mechanics" or: READ ONLINE .....>>>>