RELATIVITY’S LIGHT CONE IS NONLOCAL: FINDING QUANTUM MECHANICS IN THE LIGHT CONE
McGucken’s Law of Nonlocality: All nonlocality begins as locality. In order for two particles to become entangled, they must first share a common locality. As they separate, they may yet share the orginal locality, and we see them to be entangled. Thus, over time, locality is someting which expands into nonlocality. What mechanism might provide this nonlocality? The expansion of the fourth dimension at the rate of c, as given by Einstein’s/Minkowski’s x4=ict or dx4/dt=ic. And so it is that locality becomes nonlocality at a rate less than or equal to the velocity of light c.
The McGucken Conjecture: ALL LIGHT CONES ARE NONLOCAL
RELATIVITY’S LIGHT CONE IS NONLOCAL: FINDING QUANTUM MECHANICS IN THE LIGHT CONE
It is quite remarkable that quantum mechanics can be seen in Einstein’s/Minkowski’s light cone in the figure below. Here’s how:
Consider two photons A and B in the below figure representing McGucken’s Light Cone.
As time passes on our watch, the photons propagate through space. No matter how far they travel, they will have not moved through x4. And thus x4 must be moving and expanding. As the photons remain stationary in x4, we may expect them to share a common locality and thus remain entangled no matter how far they travel. And too, one can see the origins of quantum mechanical probabilities in McGuckne’s Light Cone figure. As the expansion of x4 is perfectly symmetric, a photon has an equal chance of being found anywhere upon the expanding surface, which is exactly how photons behave. Quantum nonlocality walks hand-in-hand with quantum probability, and we finally see why. And too, as is even more apparent quantum nonlocality walks hand-in-hand with quantum entanglement. Simply put, quantum entanglement, nonlocality, and probability are all seen to derive from the exact same foundational physical reality of the fourth expanding dimension. And thus quantum mechanics, like relativity, arises from LTD’s simple principles of a fourth expanding dimension.
And please note how AMAZING this is. For, my friend, we have just seen all of quantum mechanics in the light cone which Minkowski and Einstein introduced to better explain relativity, even as Einstein yet rejected the nonlocality, entanglement, and probabilities found in quantum mechanics. And yet, there it all was, right before his eyes.
The light cone represents the expanding nonlocality of x4, wherein every point of x4 becomes an expanding wavefront, exactly as Christian Huygens first noted in Huygens’ Principle in the 1600s.
The Huygens-Fresnel Principle: Every point on a wavefront is a source of wavelets. These wavelets spread out in the forward direction, at the same speed as the source wave. The new wavefront is a line tangent to all of the wavelets.
When Huygens first stated thusly, he was considering the light of a candle in conjunction with the behavior of waves passing barriers on the ocean. It would be about three hundred more years before relativity showed that photons remain stationary in the fourth dimension, and yet another hundred years until Dr. E recognized this reality and exalted it in the form of a principle of the fourth expanding dimension. And thus, when Huygens was observing the character and behavior of the light emanating from his candle, he was observing the expansion of the fourth dimension! Little did he know that he was drawing the expansion of the fourth dimension in his sketch of a candle in the below figures:
