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Le 21/08/2024 à 08:15, Thomas Heger a écrit :I wrote annotations from a certain perspective:Am Dienstag000020, 20.08.2024 um 08:16 schrieb Python:The distance between A and B can be denoted in a lot of ways. The pointLe 20/08/2024 à 08:02, Thomas Heger a écrit :>Am Montag000019, 19.08.2024 um 14:56 schrieb Python:>Le 19/08/2024 à 08:44, Thomas Heger a écrit :>Am Sonntag000018, 18.08.2024 um 12:05 schrieb Python:>
>>Two identical clocks, A and B, are stationary relative to each other at a certain distance. Their identical functioning (within measurement accuracy) allows us to assume that they "tick at the same rate." NOTHING more is assumed, especially regarding the time they display; the purpose is PRECISELY to adjust one of these clocks by applying a correction after a calculation involving the values indicated on these clocks during specific events, events that occur AT THE LOCATION OF EACH CLOCK.>
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Einstein’s procedure is not strictly a synchronization procedure but a method to VERIFY their synchronization. This is the main difference from Poincaré’s approach. However, it can be proven that Poincaré’s method leads to clocks synchronized in Einstein’s sense. You can also transform Einstein’s verification method into a synchronization procedure because it allows calculating the correction to apply to clock A.
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*Steps of Einstein's Method:*
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When clock A shows t_A, a light signal is emitted from A towards B.
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When this signal is received at B, clock B shows t_B, and a light signal is sent from B back towards A.
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When the signal is received at A, clock A shows t'_A.>Relativity requires mutally symmetric methods. So if you synchronize clock B with clock A, this must come to the same result, as if you would synchronize clock A with clock B.>
It is.
No, it is not!
It is. It is explained in my initial post : What is (AB)/c to you?
AB was actually meant as:
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distance from A to B,
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even if A and B are in fact position vectors, hence AB would usually be the scalar product of A and B (what is absurd).
Yes it would be absurd. BTW you are conflating affine spaces with
vector spaces here.
>Besides of this little formal issue (actually meant was |r_AB| ),>
Well, Thomas, this is utterly ridiculous. Any reader understands what
AB as it appears in 2AB/(t'_A - t_A) is the distance AB. From high
school to Ph. D.
"the distance AB" is not equal to "AB"!
is to ensure that there is no ambiguity given the context. As a matter
of fact Einstein in the ORIGINAL paper used an overbar on top of
AB (https://myweb.rz.uni-augsburg.de/~eckern/adp/history/einstein-papers/1905_17_891-921.pdf)
So if there were someone to blame here, it would be the translator.
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