yogi said:
Your post 37: When I say nil wrt to acceleration - I am saying the acceleration per se does not have anything to do with the clock rate difference. It tells us only which clock moved - and Einstein tells us that the clock that moves accumulates less time wrt to the clock which has not been accelerated.
No, Einstein says nothing like that, that's your own weird misinterpretation. You quoted him as saying that if a clock is "moved in a closed curve with constant velocity" it will show less time than one that moves inertially, which of course is true, but this cannot be generalized to the statement that if two twins were initially at rest with respect to each other and then one accelerated, the one that accelerated will automatically be the one whose clock shows less time when they meet (in the cosmological twin paradox this is not true, for example).
yogi said:
I do not agree that the twin that accelerated away from Earth could age more, when compared to the stay at home twin - the SAHT has remained in the same inertial system - and will always accumulate more time than the clock which flies away - irrespective of the state of the Earth's motion wrt anything else. We do not know if there is a preferred coordinate system defined by the mass of the universe.
The "preferred coordinate system" has nothing to do with the
mass of the universe, it has to do with the fact that in this paradox we are imagining a "compact" universe where if you travel far enough in one direction you will return to your point of origin. It has been established by physicists that this leads to a preferred coordinate system--look at
this paper by John Barrow and Janna Levin which says:
Twins traveling at constant relative velocity will each see the other's time dilate leading to the apparent paradox that each twin believes the other ages more slowly. In a finite space, the twins can both be on inertial, periodic orbits so that they have the opportunity to compare their ages when their paths cross. As we show, they will agree on their respective ages and avoid the paradox. The resolution relies on the selection of a preferred frame singled out by the topology of the space.
So, whichever twin is at rest in this preferred frame, he will have aged more than the twin moving in it when they meet again. Thus, if the Earth is moving in this preferred frame with some finite velocity v, and then the Earth twin accelerates briefly so that his velocity is now 0 in this frame, and then both continue to move inertially away from each other, when they meet again it will be the Earth twin who is older, even though he was the one who accelerated.
yogi said:
And no, i do not agree with your last statement - knowing which clock moved is critical to determining which clock runs slower in SR
In a way that's true, because in SR there is no analogue of the cosmological twin paradox, so if two twins start out at the same position then meet again at the same position, one must have turned around (accelerated), and he will be younger. The problem is that you mistakenly generalize this to cases like the one where the two twins started out at completely different positions, and say that the one who "moved" aged less as they come together and meet, even though this statement is perfectly meaningless.
Let me put it this way--do you agree that if we know the complete set of initial conditions at some time t in a particular frame (the position and velocity of both objects at t, the time on their own clocks, etc.) and we want to make some predictions about what will happen later, then since the laws of relativity are completely deterministic, these initial conditions at t are sufficient to make a unique prediction about the future? Do you agree that what happened
before t is irrelevant, including the question of which of two clocks accelerated before t?