DougMar said:
Pervect, I follow your energy conservation argument. Mayer actually talks about this.
Mayer says that if his theory is true that all rotating bodies (because they are continously accelerating) will have a very slight loss of energy.
I don't like Mayer's "bait and switch" tactics. If he started with different assumptions than GR, and then came to different conclusions, it would indeed be just a matter for experimental test.
The problem is that Mayer claims (at least most of the time) to start with the same assumptions as GR and come to different conclusions. This puts the "theory" on a different footing. His incorrect reasoning in deriving his theory, plus the lack of peer review, are the main problems the theory has. The theoretical predictions are a bit fuzzy, too, but perhaps I just missed that part, not having gotten past his first elementary errors. When the conclusion doesn't follow from the premises, I'm not very motivated to look at the predictions, since the logic itself is in error.
Let's say we put points A and B on opposite sides of a huge star. We know that light is curved by the gravity of the star. Light does take the shortest path that it can and it still looks straight to both observers, but the arc can still be measured.
So, it seems to me that if points A and B are in a spaceship on Earth, the only difference is that it is a much smaller distance between them and the gravity of the Earth is much smaller than the star. In other words, the effect would have to be much smaller. But it still seems like it should be a real arc and should be measurable to both A and B.
Let's take an analogy. Suppose one is on the surface of the Earth, and one wants to get from New York city to Sebring Ohio, both picked because they have latitudes near 40degrees N. (Let's assume that both cities have latitudes of exactly 40 degrees N for this example, for the purposes of discussion).
The shortest path between these two points is a great circle (as is the shortest path between any two points on surface of the Earth)
When you look at the curve on a plot of latitude vs longitude though (picking a specific coordinate system in the process), the curve is not a straight line. You'll find that at the midpoint of the great circle, the "great circle" curve has a latitude that's north of the 40 degrees. So if you plot this curve on a map where lines of constant latitude are horizontal lines, this line will appear to be curved.
The same thing is happening with the accelerated observer, and with the sun.
When I say that light is taking the shortest path, what I mean unambiguously is that it is following a geodisic. This does not mean that light "really" doesn't appear to curve in some specific coordinate system. In the coordinate system of the accelerated observer, it does appear to curve. But in the coordinate system of an inertial observer, the light follows a perfectly straight path.
So the bottom line is that the English phrase "straight line" is a bit imprecise. The precise statement is that light always follows a geodesic. In the accelerated coordinate system, the light that appears to "curve" up is actually following a geodesic path, known as a null geodesic.
Light that is forced to move at a constant height coordinate in the accelerated coordinate system (perhaps with a fiber optic cable) will actually be traveling a longer path than it would if it were allowed to find its way on its own.
This finds its physical expression in Fermat's principle, the principle that light always takes the path of "least time".
