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I have created energy ex nihilo. Take that, Hermann von Helmholtz!
The energy conservation law doesn’t hold in a relativistic framework. The relation is more involved and the invariant is the energy/momentum/stress tensor.
Relativistic mass is not the same as the energy. This is only true if the system in consideration has no impulse relative to the observer.
The rest mass is not the minimum energy in a system but it is the 4-dimension invariant of lets say a field under space time transformation. If you higher the energy by keeping the rest mass constant means you just rotate te energy/impule 4-vector. That way time delay ect come into play. So from the relativistic point of view ’putting’ energy into a system just means a change in perspective between the observer and the system. The total amount of energy/momentum i.e. the length of the energy momentum vector always is constant.
Everything is traveling with the speed of light always. What we see as actual velocity is ust that the direction of the motion differs from ours
In a way Toby, this brings us back to our discussion on the need of bases…
In the relativistic framework a system ’as is’ has always the speed of light means that momentum and energy is a relativistic concept i.e. depends on the choice of a frame/base. From a ’pure objective’ (everywere)-point of view energy/momentum have no meaning and only the mass (times if you like) remains.
Toby writes:
I have created energy ex nihilo. Take that, Hermann von Helmholtz!
:-) Reminds me of how I recently created antimatter without having created matter yet.
Mirco boldly asserts:
Everything is traveling with the speed of light always.
Yeah, right.
The energy conservation law doesn’t hold in a relativistic framework.
First I thought you might be thinking of situations where there is not a time-like Killing vector. But then I realized that you seem to be thinking of Minkowski space, even.
So I think what the entry needs next is a more solid basis for its assertions by means of some definitions…
In (classical) general relativity the situation is much worse than in special relativity alluded to above. The energy is not even well-defined there. There are some special solutions/symmetries/situations and limits when one can go around this problem but in general it is an unsolved problem.
The energy conservation law doesn’t hold in a relativistic framework.
I added some remarks about general relativity.
Relativistic mass is not the same as the energy. This is only true if the system in consideration has no impulse relative to the observer.
I have not seen this distinction made but it might be good to make it. By “no impulse relative to the observer” you mean that the system’s total momentum (relative to the observer) is constant? If it’s not, then how is the relativistic mass distinguished?
The rest mass is not the minimum energy in a system
I just mean that this is the smallest value of energy that any observer will measure. It is the energy inherent in the system, rather than what is observer-dependent.
Everything is traveling with the speed of light always. What we see as actual velocity is ust that the direction of the motion differs from ours
In a sense, yes. But this isn’t how physicists usually use “speed” or “velocity”.
I hope that it’s clear that much more remains to be said in this article.
Everything is traveling with the speed of light always. What we see as actual velocity is ust that the direction of the motion differs from ours
In a sense, yes.
Namely in which sense?
A lightlike vector has norm 0, a timelike vector has norm different from 0. No Lorentz transformation changes that. I don’t understand what you have in mind.
There is one way I could make sense of the statement: “Everything is travelling at the speed of light”, but I doubt that this is what you two have in mind. (Namely if we assume the standard-model+Higgs then all fundamental particles are fundamentally massless and you may with some hand-waving at Feynman diagrams read the mass picked up by the interaction with the Higgs as “particles locally zipping around at the speed of light but constantly being scattered off the Higgs such as to effectively move slower”. )
I thought of that second one too, but the way that Mirco wrote ‘the direction of the motion differs from ours’, I took it to mean this idea:
For timelike or spacelike curves, the natural parametrisation is arclength, and the magnitude of the (mathematical) velocity vector is then (obviously) , the speed of light. This parametrisation is unavailable for lightlike curves, but we argue by continuity that the quantity ‘magnitude of the velocity vector with arclength parametrisation’ (which essentially comes out as in this case) is morally still . Since a magnitude of a velocity vector is a speed, and the speed of light is (and it’s easy enough to make it come out explicitly to if you want), then everything travels at the speed of light. People will even talk about how an object at rest is moving only in the timelike direction, while a lightlike particle has this speed split between time and space (and an infinite-speed tachyon is moving only in space).
This idea seems to help some people understand Minkowski spacetime (or maybe it just makes them think that they understand it), but then one has to realise that this is not what a physicist means by “speed”.
I see. If that is meant, I’d strongly suggest to speak about it not as “travelling at the speed of light”. As you point out, the argument does not in fact generalize to lightlike motion. The more precise conclusion of this argument is roughly the opposite:
Everything that is not lightlike is at rest (namely in its own reference frame)! :-)
@Urs: Saying everything with mass is in rest is not a good picture because:
It is at least better than what you had proposed ;-). It’s the way that I could make sense of Toby’s attempt to make sense of what you said.
But I’d rather see this discussion come back to substantial issues.
@ Mirco re relativistic mass.
I suspect another translation error. The rest mass is the same as the energy if the momentum is zero. But the relativistic mass is the same as the energy regardless. See Wikipedia for terminology.
I agree that ‘mass’ normally means rest mass in modern physics. Only the phrase ‘relativistic mass’ is different.
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