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{"id": "1EIQ9DS85nqo9HAeViHxwMvzs7LeZ_wRl", "title": "Testing relativity of simultaneity using GPS satellites.pdf", "mimeType": "application\/pdf"}
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1
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Testing relativity of simultaneity using GPS satellites
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Kuan Peng 彭宽 titang78@gmail.com
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25 October 2019
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Abstract: Relativity of simultaneity can be measured with clocks of GPS satellites.
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1. Time-slide in GPS system
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In Special Relativity relativity of simultaneity is the fact that 2 simultaneous events occurring in a
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stationary frame does not appear simultaneous in a moving frame. For example, in Einstein's train
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thought experiment 2 simultaneous flashes of light on the platform do not appear simultaneous for the
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observer in the train. But relativity of simultaneity has never been tested with real simultaneous events.
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For testing relativity of simultaneity we need 2 synchronized clocks moving at high speed and we will
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read them in a stationary frame. Fortunately, we have at hand many GPS satellites which carry
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precision clocks and broadcast their time, with which we can check relativity of simultaneity.
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Figure 1 shows an example of 8 GPS satellites in a circular orbit. F1 is the
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frame moving with the satellite 1, its x axis passes through the satellites 1
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and 2. In a frame that coincides with F1 at time 0 and stationary with respect
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to the Earth, the positions of the satellites 1 and 2 are x1 and x2. Suppose
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that 2 simultaneous events occur at x1 and x2 in the stationary frame. In the
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moving frame F1 these same events will occur at the times t'1 and t'2 on the
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satellites 1 and 2 respectively. t'1 and t'2 are determined by the time equation
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of the Lorentz transformations which is equation (1) with v being the
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velocity of the satellite 1. We call t'2 - t'1 the time-slide of the event at x2
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with respect to that at x1. The time-slide of the satellite 2 with respect to the
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satellites 1 is approximately expressed by equation (2) because the
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velocities of the satellites 1 and 2 are not parallel.
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In order to get a precise expression of the time-slide of the satellite 2, let
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us imagine that there are n satellites between the satellites 1 and 2. In
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the frame of the i
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th satellite the time-slide between the satellites i and
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i+1 is 'i which is expressed by equation (3), where i is the distance
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between these 2 satellites. Equation (3) is sufficiently precise if the
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satellites i and i+1 are so close that their velocities can be taken as
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parallel. By summing all i from i=1 to n, we obtain t'2 - t'1 the time- slides of the satellite 2 which is expressed in equation (4).
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When n is very big, the sum of all the distance i equals p2, the length
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of the arc between the satellites 1 and 2, see Figure 2. So, the time-slide
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of the satellite 2 is precisely expressed with p2 in equation (5).
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For all the satellites in Figure 1, the time-slide of the j
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th satellite with
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respect to the satellites 1 is t'j- t'1 and is expressed by equation (6) with
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pj being the arc from the first satellite to the jth satellite and j being any
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number from 1 to 9. The 9th satellite is in fact the first satellite because
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the orbit is a circle.
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The time-slide of the 9th satellite is t'9 - t'1 and is non-zero. So, due to
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relativity of simultaneity the time of the 9th satellite is different from
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that of the first satellite. But this is impossible in real world because the
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9th satellite is the first satellite.
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On the other hand, the synchronization of the satellites is not obvious.
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Figure 1
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′ =
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−
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1 −
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(1)
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′
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−
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′
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≈ −
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(
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−
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)
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1 −
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(2)
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∆
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′
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= −
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∆
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1 −
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(3)
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−
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′
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=
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∆
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= −
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1 −
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∆
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(4)
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Figure 2
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′
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−
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′
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= −
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1 −
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(5)
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′
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−
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′
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= −
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1 −
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(6)
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=
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∆
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Earth
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GPS satellites
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F1
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x2, t'2
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x1, t'1
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Page 1 of 4
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Page 2 of 4
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2
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According to the Wikipedia page Basic concept of GPS: "The satellites carry very stable atomic
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clocks that are synchronized with one another and with the ground clocks." So, the satellites 1 and 2
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for example must be synchronized with one clock on Earth, that is, the event "time of the satellite 1 is
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t0" and the event "time of the satellite 2 is t0" occur simultaneously on Earth. But, as the satellite 2 has
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a non-zero time-slide with respect to the satellite 1, the satellite 2 cannot be synchronized with the
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satellite 1 in orbit. Conversely, if the satellite 2 is synchronized with the satellite 1 in orbit, the reading
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of their time on Earth would be different. So, due to relativity of simultaneity the satellites 1 and 2
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cannot be synchronized with the clock on Earth and with one another at the same time.
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Nevertheless, let us compute the value of t'9 - t'1. The radius of the GPS orbit is 26 600 km (see the
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Wikipedia page Structure of the orbit of GPS satellites), the circumference of this orbit is 167 133 km,
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that is, p9 = 167 133 km. The velocity of the satellites is 3.87 km/s, the speed of light is 299792 km/s.
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Then, the time-slide of the 9th satellite is t'9 - t'1 = - 7204 ns. If this time-slide really exists but is not
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correctly dealt with, the GPS system would give wrong coordinates on Earth.
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The coordinates computed by GPS devices on Earth using the time of satellites are actually correct,
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which proves that the clocks of the satellites are really synchronized with the clock on Earth and also
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with one another. This is impossible if relativity of simultaneity affects GPS satellites.
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2. Time-slide and length contraction
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What is the consequence if relativity of simultaneity were not true? Relativity
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of simultaneity is given by the time equations of the Lorentz transformations
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which are derived from the space equations that are the equations (7) and (8). By
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substituting equation (7) for x' in equation (8), we obtain equation (9) which we
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transform into equation (10). By substituting equation (8) for x in equation (7),
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we obtain equation (11) which we transform into equation (12). Equations (10)
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and (12) are the 2 time equations.
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So, the system of the 2 time equations is a linear
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rearrangement of the system of the 2 space
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equations and these 2 systems are equivalent.
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This is why the length-contraction-caused Ladder
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paradox can be explained using relativity of
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simultaneity. But also, a contradiction with
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relativity of simultaneity leads to a contradiction
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with length contraction.
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3. Orbital length contraction
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Does the said contradiction with length contraction exist? Let us show it with geostationary satellites
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which are particularly appropriate for this purpose because they are stationary with respect to
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observers on Earth, they all move at the same velocity and their orbit is circular.
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A satellite is located with respect to the center of the Earth by a vector called position vector which we
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can precisely determine with radars on Earth. Once the position vectors of 2
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satellites are determined, we can derive the distance between them and check if
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this distance verifies length contraction.
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In the example shown in Figure 3, the 8 geostationary satellites are immobile in
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the sky for an observer on Earth, that is, they are immobile in the frame of the
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observer which we denote by A. In a frame in space which does not rotate with
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the Earth, these satellites move around the Earth. This frame is denoted by B.
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The position vectors of the satellites 1 and 2 are R1 and R2 in the frame A at
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′ =
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−
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1 −
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(7)
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=
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′ +
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′
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1 −
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(8)
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1 −
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=
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−
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1 −
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+
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(9)
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′ =
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−
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1 −
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(10)
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′
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1 −
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=
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+
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′
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1 −
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−
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(11)
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=
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+
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′
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1 −
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(12)
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Figure 3
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Geostationary
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satellites
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R1
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Earth's
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center
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R2
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l
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Page 2 of 4
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Page 3 of 4
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3
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time 0. The angle made by the vectors R1 and R2 is , which is the angular position of the satellite 2
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with respect to the satellite 1. For n satellites that are equally spaced in orbit, the angle from one
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satellite to the next is always and the angular position of the i
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th satellite is the angle (i-1) in the
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frame A.
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The frame B is such that the position vectors of the satellite 1 in the frame A and B coincides at time 0
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and equal R1. In the frame B the position vector of the satellite 2 is R'2 and the angle made by R1 and
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R'2 is . Since the angle from one satellite to the next is always , the angular position of the i
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th
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satellite is the angle (i-1).
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Let l be the distance between the satellites 1 and 2 in the frame A. In the frame B
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the satellites being moving, the length l undergoes length contraction and the
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distance between these 2 satellites is l'. The ratio of length contraction is l'/l,
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which is given by equation (13). Because l' < l , R'2 is slightly closer to R1 than R2
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and we have <.
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The angular position of the n+1th satellite is n=2 in the frame A and n in the frame B. n is
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smaller than 2 because <. But, the geostationary orbit being a circle, the n+1th satellite is the first
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satellite and it is impossible that the n+1th satellite is not at the angular position 2 while being the first
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satellite.
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So, length contraction in orbit creates a gap between the n+1th satellite and the first satellite in the
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frame B, which is the same type of contradiction than the contradiction with relativity of simultaneity.
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The value of this gap is computed by equation (14) using the parameters of the geostationary orbit: the
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orbital speed is 3.0746 km/s, the radius of the orbit is 42 164 km and the circumference of the orbit is
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nl = 264 924 km. The value of the gap is then 14 mm, which is too small to be
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measured. But for particles traveling in a circular accelerator at a fraction of the
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speed of light, this gap is significantly big.
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4. Circular accelerator
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In « How to test length contraction by experiment? », I have proposed to
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test length contraction using n fast moving electrons in a circular
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accelerator. The electrons are equally spaced in the accelerator tube as
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Figure 4 shows. For an observer situated at the center of the accelerator
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and rotating with the electrons, the electrons are immobile and the length
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of the chain of electrons from number 1 to number n+1 equals the
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circumference of the accelerator tube, the n+1th electron being the first
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electron.
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At the velocity of 0.865 c, the ratio of length contraction equals 0.5,
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which implies that, for an observer who measures the moving electrons
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using the detectors in the laboratory, the length of the chain of electrons
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equals half the circumference of the accelerator tube and he would see all
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the n electrons squeezed into one half of the accelerator tube and the other
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half is empty, as shown in Figure 5. It is impossible that the n+1th electron
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is not at the place of the first electron because they are the same electron.
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5. Comments
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In section 1, I have shown that GPS satellites cannot be synchronized in
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accordance with relativity of simultaneity. In « Astrophysical jet and
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length contraction » I have shown that relativistic jets ejected by black
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=
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1 −
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≈ 1 − 1
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2
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(13)
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(
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−
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′) ≈
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2
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(14)
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Figure 4
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Figure 5
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n+1th
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electron
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Accelerator's tube
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Lab observer
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First
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electron
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Electrons
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Detectors
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Accelerator tube
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Rotating
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observer
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Page 3 of 4
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Testing relativity of simultaneity using GPS satellites.pdf
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Testing relativity of simultaneity using GPS satellites.pdf
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