DaleSpam said:
JustinLevy said:
The third law is not really true except at zero spatial separation (even if you want to consider v << c, it is still observable in electrodynamics, the forces between two spatially separated particles need not be equal and opposite).
I wouldn't say it this way. I would instead say that the third law is correct and all interactions are local. The third law is essentially the conservation of momentum, which always holds, so to me it seems confusing to phrase it the way you did: "not true except X" where X is a condition that always holds.
Yes, you could say it that way. But textbooks have worded it my way as well.
We will quickly devolve into semantics here if we try to continue this. Part of the problem is we know local realism to be false, and additionally we cannot, even in principle, measure if each vertex in a feynman diagram individually conserves momentum or if the process conserves momentum. I have seen annoying arguments over whether being "off shell" has the same mass but violates momentum conservation temporally, or whether "off shell" has a different mass and conserved momentum always... it can't be measured, it is just arguing math definitions.
So let me summarize with this: Yes you could say it that way. That is a consistent point of view. And while Griffith's EM textbook is saying the opposite to undergrads across the nation, your wording is probably the convention most physicists would take.
To clear up any confusion, if people wish to take that stance, it seems easier to just say: Newton's third law is that momentum is conserved locally.
cincirob said:
Justin,
Regarding your comment, "Special relativity postulates the laws of physics have poincare symmetry."
I found a copy of Einstein's orginal paper and I don't see a refernce to poincare in the postulates. Do you have another reference?
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I'm not quite sure what you are ultimately asking for here: a reference that explains poincare symmetry so that you can understand that comment, or if you are literally asking for another reference to Einstein's paper which has more in it or something.
For the first, wikipedia gives the basics. You could start there. If you want more, maybe someone can recommend a book dealing more directly with this. Depending on your background, if you want to see how it is used in practice in modern physics, most QFT books approach relativity strictly from the symmetry it provides (often using the lie algebra of the group).
As for the second, no, einstein's paper does not refer explicitly to poincare symmetry. Science isn't a theology. Einstein's 1905 paper isn't the only word and last word on relativity, just as his 1916 paper isn't the only and last word on general relativity.
It is interesting to go back and read some original papers, but I would not recommend them for starting points of learning the material. Maxwell's original paper for electrodynamics is very difficult to read now, Einstein's GR is never taught now how it was presented there, the first paper on path integrals is also a more vague presentation than some of the more modern presentations, and even special relativity has been made more precise over the years (although I would say of the examples I listed here, it probably is the one that has held up best for 'accessibility').
DrGreg said:
I ask readers of this thread to consider: do you think the specification of a particular inertial frame includes the choice of spatial coordinates? Do you think it is compulsory to use Cartesian
xyz coordinates, or would spherical polar r\theta\phi coordinates be permissible too? Do you think the metric
ds^2 \, = c^2 \, dt^2 \, - \, dr^2 \, - \, r^2 (d\theta^2 \, + \, d\phi^2 \, sin^2 \theta)
defines an inertial frame or not?
(I have just asked the same question in three different ways.)
Hmm... that's a neat point.
At this time I would say no, that is not an inertial coordinate system. But I have a feeling you may be changing my mind soon :)
The reason I would say no, is because the basis vectors themselves are now spatially dependent. This doesn't describe space in a homogenous way. The metric itself is even now described in a way that is spatially dependent. Of course it is still describing the same spacetime, and the spacetime is still flat, but that can be said of any coordinate system we choose.
Taking a step back though,
I would have to say that we have all jumped back and forth between coordinate representations for some problems, and at least personally, I didn't really think of it as going inertial <-> non-inertial when using non-cartesian coordinates. I guess it didn't really matter (since this is merely a semantic distinction), but I didn't think about it much. To include these, it seems like you would be allowing any coordinate system which preserves the same time slices as an "inertial" frame above, but rearranges the spatial coordinates.
DrGreg said:
If you allow non-cartesian coordinates in an inertial frame, then logically you ought to allow non-standard synchronisation and non-standard (but flat) metric forms. If you choose to go down this route then any statement of Newton's Laws will need to be appropriately worded to make sense (and be true) in your choice of coordinate system.
For an example of an abnormally synchronised system let
txyz be Einstein-synchronised Minkowski coords in an inertial frame and define
TXYZ by
T = t + vx/c2
X = x
Y = y
Z = z
In this coordinate system the coordinate speed (\sqrt{(dX/dT)^2 + (dY/dT)^2 + (dZ/dT)^2}) of light is anisotropic. Do you think
TXYZ is an inertial coordinate system?
I agree, if you consider the spherical coordinate as 'inertial', then it would be difficult not to consider any coordinate system which uses planar time slices in spacetime as such as well. While you gave your coordinate system example above by changing the time coordinate, since it was a linear transformation, it still has a planar time slice, and can be written also as a coordinate transformation from an inertial coordinate system which only changes the spatial coordinates around.
Since this is just a semantics thing, does everyone agree they fall on one side or the other of DrGreg's delineation? If so, he's nailed the main distinction and there probably isn't anything more to discuss. But if someone actually is trying to pick and choose from each side ... I'd love to hear their "third choice".
