Now in the last entry, we pointed out that coordinate change in clock time 2 is "likely as not" the change in coordinates with space just as clock time 1 is the change in coordinates in energy to matter. We know about clock time 1 because it ceases to exist due to a conservation of coordinate change as matter is accelerated to the speed of light. That is, at that transition, clock time one goes linear. We therefore posit that clock time 2 goes linear when space converts to matter and perhaps, we now add, that clock time 3 goes linear when non-linear time (pre-space as it were) goes to space thereby providing for the 3 dimensions which you experience, just in case you didn't see that one coming.
And, just to show that I'm kidding and not really bitter about the snubbing going on out there I will throw out that clock time 4 is likely to take what we perceive as non-linear time and add an entirely separate dimension, perhaps going out in a direction we cannot see and allowing for an infinite number of clock times so that you string theorists can continue to play with your multi-dimension constructs within NLT theory just as you do in General Relativity, but perhaps that is another story.
For now, for all you great ponderers out there, ponder this. If we have an interest in manipulating ct1, what is the basis for this so-called "simple time travel" that appears in prior blog entries in light of all this non-linearity and consumption of space (in the form of space, energy and matter) in black holes and regurgitation outside of gravity wells? That is, we are able to show that non-linear space can ignore coordinate changes to potentially move from anywhere to anywhere else (at least if there is a way to overcome gravity). We also know that certain relative coordinate changes (orbits, as it were) allow us to get away from at least some of the effects of gravity, we posit that there may be clock times that function as independent of clock time 1 as dimensions do (that is we can go forward and back in dimensions along clock time 1) so how easy might it be to go back in time. I.E. is it possible, that I merely went back 2500 years, copied Zeno's lost paradoxes and wrote them up so that all of this is just so much plagiarism? Unlikely, because I'd have to build the time machine before I saw him, but that is the nature of paradoxi is it not?
And so I have given you the basics for instantaneous travel from one point to another in the universe, movement along time (you can go back and leave yourself a note to change all your mistakes), I've reinstated credit for hologram theory with the ancient Greeks where it belongs, I've at there very least given you something to think about, and you haven't even sent me a card? That's a fine "how do you do"; but that will have to wait for another chapter.
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