On Monday, April 15, 2019 at 8:14:35 PM UTC-6, [email protected] wrote: > > > > On Friday, April 12, 2019 at 5:48:23 AM UTC-6, [email protected] wrote: >> >> >> >> On Thursday, April 11, 2019 at 10:56:08 PM UTC-6, Brent wrote: >>> >>> >>> >>> On 4/11/2019 9:33 PM, [email protected] wrote: >>> >>> >>> >>> On Thursday, April 11, 2019 at 7:12:17 PM UTC-6, Brent wrote: >>>> >>>> >>>> >>>> On 4/11/2019 4:53 PM, [email protected] wrote: >>>> >>>> >>>> >>>> On Thursday, April 11, 2019 at 4:37:39 PM UTC-6, Brent wrote: >>>>> >>>>> >>>>> >>>>> On 4/11/2019 1:58 PM, [email protected] wrote: >>>>> >>>>> >>>>>>> >>>>>> He might have been referring to a transformation to a tangent space >>>>>> where the metric tensor is diagonalized and its derivative at that point >>>>>> in >>>>>> spacetime is zero. Does this make any sense? >>>>>> >>>>>> >>>>>> Sort of. >>>>>> >>>>> >>>>> >>>>> Yeah, that's what he's doing. He's assuming a given coordinate system >>>>> and some arbitrary point in a non-empty spacetime. So spacetime has a non >>>>> zero curvature and the derivative of the metric tensor is generally >>>>> non-zero at that arbitrary point, however small we assume the region >>>>> around >>>>> that point. But applying the EEP, we can transform to the tangent space >>>>> at >>>>> that point to diagonalize the metric tensor and have its derivative as >>>>> zero >>>>> at that point. Does THIS make sense? AG >>>>> >>>>> >>>>> Yep. That's pretty much the defining characteristic of a Riemannian >>>>> space. >>>>> >>>>> Brent >>>>> >>>> >>>> But isn't it weird that changing labels on spacetime points by >>>> transforming coordinates has the result of putting the test particle in >>>> local free fall, when it wasn't prior to the transformation? AG >>>> >>>> It doesn't put it in free-fall. If the particle has EM forces on it, >>>> it will deviate from the geodesic in the tangent space coordinates. The >>>> transformation is just adapting the coordinates to the local free-fall >>>> which removes gravity as a force...but not other forces. >>>> >>>> Brent >>>> >>> >>> In both cases, with and without non-gravitational forces acting on test >>> particle, I assume the trajectory appears identical to an external >>> observer, before and after coordinate transformation to the tangent plane >>> at some point; all that's changed are the labels of spacetime points. If >>> this is true, it's still hard to see why changing labels can remove the >>> gravitational forces. And what does this buy us? AG >>> >>> >>> You're looking at it the wrong way around. There never were any >>> gravitational forces, just your choice of coordinate system made fictitious >>> forces appear; just like when you use a merry-go-round as your reference >>> frame you get coriolis forces. >>> >> >> If gravity is a fictitious force produced by the choice of coordinate >> system, in its absence (due to a change in coordinate system) how does GR >> explain motion? Test particles move on geodesics in the absence of >> non-gravitational forces, but why do they move at all? AG >> > > Maybe GR assumes motion but doesn't explain it. AG > >> >> Another problem is the inconsistency of the fictitious gravitational >> force, and how the other forces function; EM, Strong, and Weak, which >> apparently can't be removed by changes in coordinates systems. AG >> > > It's said that consistency is the hobgoblin of small minds. I am merely > pointing out the inconsistency of the gravitational force with the other > forces. Maybe gravity is just different. AG > >> >> >> >>> What is gets you is it enforces and explains the equivalence principle. >>> And of course Einstein's theory also correctly predicted the bending of >>> light, gravitational waves, time dilation and the precession of the >>> perhelion of Mercury. >>> >> >> I was referring earlier just to the transformation to the tangent space; >> what specifically does it buy us; why would we want to execute this >> particular transformation? AG >> >>> >>> Brent >>> >> *I could be mistaken, I usually am, but ISTM that labeling all points in spacetime as (t, x, y, z) makes no sense since there is no universal clock in GR. Each observer has his own clock in GR. No "Bird's Eye" observer GR. So what could the same t for all spatial points mean, or increasing t's as time evolves? AG*
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