memex/0_inbox/in/books/TWOW/html/22 The Symmetry of the Lorentz Distortions in Pairs of Inertial Frames.html

<!DOCTYPE HTML PUBLIC "-//W3C//DTD HTML 4.0 Transitional//EN">
<html>
<head>
	<meta http-equiv="content-type" content="text/html; charset=utf-8">
	<title>The Symmetry of the Lorentz Distortions in Pairs of Inertial Frames</title>
	<meta name="generator" content="LibreOffice 4.2.8.2 (Linux)">
	<meta name="author" content="Amr Gharbeia">
	<meta name="created" content="20010831;10600000000000">
	<meta name="changed" content="20150721;232948057731710">
	<style type="text/css">
	<!--
		@page { margin-right: 1.2cm; margin-top: 1.2cm; margin-bottom: 1.25cm }
		p { text-indent: 1.27cm; margin-bottom: 0.25cm; direction: ltr; color: #99ccff; line-height: 120%; text-align: left; widows: 2; orphans: 2 }
		p.western { font-family: "Arial", sans-serif; font-size: 10pt; so-language: en-US }
		p.cjk { font-family: "Times New Roman", serif; font-size: 10pt }
		p.ctl { font-family: "Simplified Arabic"; font-size: 10pt; so-language: ar-EG }
		p.sdendnote-western { margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; direction: ltr; color: #000000; font-family: "Times New Roman", serif; font-size: 10pt; so-language: en-US; line-height: 150%; text-align: left; widows: 0; orphans: 0 }
		p.sdendnote-cjk { margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; direction: ltr; color: #000000; font-family: "Times New Roman", serif; font-size: 10pt; line-height: 150%; text-align: left; widows: 0; orphans: 0 }
		p.sdendnote-ctl { margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; direction: ltr; color: #000000; font-family: "Times New Roman", serif; font-size: 12pt; so-language: ar-SA; line-height: 150%; text-align: left; widows: 0; orphans: 0 }
		a:link { color: #0000ff }
		a.sdendnoteanc { font-size: 57% }
	-->
	</style>
</head>
<body lang="en-GB" text="#99ccff" link="#0000ff" dir="ltr">
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><font color="#993366"><font face="Verdana, sans-serif"><b>T<img src="data:image/png;base64,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" name="TtsOtkCLStr_13" align="right" hspace="5" width="300" height="29" border="0">he
Symmetry of the Lorentz Distortions in Pairs of Inertial Frames. </b></font></font>The
four Lorentz distortions make it impossible to detect absolute rest
(or absolute motion) by any local experiment, that is, by ordinary
interactions among material objects on moving inertial frames, such
as interferometers and comparing light clocks with dynamic clocks.
But as Einstein's argument emphasized, the empirical equivalence of
inertial frames implies that they are equivalent globally as well as
locally. It is also impossible to detect absolute motion by
experiments involving the relationships between inertial frames with
high relative velocity, for example by comparing how fast their
clocks are ticking or how long their measuring rods are. And as the
symmetry of the two sets of Lorentz transformation equations implies,
what makes it impossible to detect absolute motion by such global
experiments is that the Lorentz distortions <i>always </i>appear to
be occurring in the <i>other </i>inertial frame as a function of the
velocity of the two references <i>relative </i>to one another. Thus,
in order to explain the empirical equivalence of inertial frames
ontologically, we must explain this symmetry in the members of any
pair of inertial frames as an appearance. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
first step in that explanation is to take note of how clocks on
inertial frames are mis-synchronized by using Einstein’s definition
of simultaneity at a distance, if the velocity of light is actually
due to an inherent motion in space itself. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
second step is to show how that mis-synchronization of clocks on
inertial frames moving rapidly across space combines with the Lorentz
distortions that they are actually suffering as a result of their
absolute motion to make it appear that Lorentz distortions are always
in the other inertial frame (and that the rate seems to be a function
of their relative velocity). </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><font face="Verdana, sans-serif">T<img src="data:image/png;base64,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" name="TtsOtkCLStr_14" align="right" hspace="5" width="350" height="29" border="0">he
mis-synchronization of moving clocks. </font>The strategy of
spatiomaterialism is to explain the truth of the principle of
relativity on the assumption that all forms of matter, including
light and material objects, coincide with parts of space. The
assumption that both matter and space are substances enduring through
time makes it possible to explain presentist change, but it also
entails that space and time are absolute. Thus, it must reject
Einstein’s definition of simultaneity at a distance. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Einstein
stipulates that a local event is simultaneous with the moment of
reflection of a light signal from a distant mirror when that local
event occurs halfway through the total period required for the signal
to travel there and back. That is to assume that the velocity of
light is the same in both directions. This assumption is true on
inertial frames at absolute rest, but it is not true on objects
moving through absolute space. If light everywhere has a fixed
velocity relative to absolute space, the velocity of light relative
to a moving frame is slower traveling outward in the direction of
forward motion and faster in the opposite direction. Thus, clocks on
moving frames that are synchronized according to Einstein’s
definition of simultaneity at a distance will be actually
<i>mis</i>-synchronized. It is important to be clear about the nature
and amount of the error introduced, because mis-synchronization plays
a crucial role in causing the appearances that make absolute motion
undetectable by comparing inertial frames with one another, or the
symmetry of Lorentz distortions in pairs of inertial frames. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
most revealing way to show the mis-synchronization is to use a
diagram to represent the spatial and temporal relations among the
relevant events. This is to use the Newtonian diagram of space and
time, which is the spatiomaterialist counterpart to Minkowski’s
“graphical method” of using spacetime diagrams for “visualizing”
what is going on, and it is both simpler and easier to understand.
Since spatiomaterialism assumes that space is a substance and, thus,
absolute, the argument may begin with the coordinate frame at rest in
absolute space. Nothing precludes representing time as an axis
perpendicular to spatial dimensions, as long as we do not assume that
anything exists but what is located on lines parallel to our absolute
space-axis (horizontal lines in the diagram) for each moment. We can
<i>refer </i>to events in the past and future, even though they do
not exist, because they can be interpreted as references to space and
matter which have, as substances, an existential aspect that entails
that they did exist and will exist. We can also represent the motion
of the other inertial frame as a timeline whose slope depends on its
velocity (<i>t = x/v</i>), as Minkowski did. Furthermore, we can take
this timeline to be the time-axis of the moving inertial frame,
because that involves only a simple Galilean coordinate
transformation of the kind used in Newtonian physics. So far, this is
equivalent to Minkowski’s spacetime diagram. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Spatiomaterialism
cannot, however, go on to assume that the moving frame has a
space-axis that is inclined relative to our absolute space-axis, as
Minkowski's spacetime diagram does. We must assume that moving
measuring rods always lie parallel to the absolute space-axis, since
all parts of moving rods are particular substances and must exist at
the same time. But spatiomaterialism does hold, following Lorentz,
that moving measuring rods lying in the direction of motion are
contracted, and so we must recognize that the moving measuring rod is
shorter than it would be if it were at absolute rest. Now, to see the
significance of Einstein’s definition of simultaneity at a
distance, we need only consider the geometry of synchronizing clocks
in absolute space and time, that is, from the point of view of the
absolute frame depicted below. (See the diagram below comparing the
synchronization of both forward and afterward clocks on the absolute
and moving inertial reference frames.) </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: -3.81cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img src="data:image/png;base64,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" name="StrSynchronization" align="bottom" width="702" height="287" border="0"></font></p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
foregoing diagram depicts the general nature of the
mis-synchronization, but we will need to know just how much clocks
are mis-synchronized. Thus, consider the following diagram in which
the moving measuring rod is depicted as <i>L'.</i> </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img src="data:image/png;base64,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" name="StrMisSynch" align="bottom" width="406" height="449" border="0"></font></p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
length of the contracted moving measuring rod in absolute space is
<i>L'</i>. It is depicted at four locations that it occupies at
crucial moments during the process of synchronization. The thinner
inclined lines trace the path of each end of the rod where clocks are
located. The thin dotted-line represents the path of the light used
to synchronize the clocks at each end. Following Einstein’s
definition of simultaneity, (1) moving observers send a light signal
forward from the origin of their frame, (2) the light is reflected
from a mirror at the forward end of their measuring rod (and the
clock there is set at <i>0</i>), and (3) they record when it returns.
Einstein’s definition requires moving observers to set their clocks
on the assumption that the light was reflected halfway through the
total period required for its round trip. Since the light signal
reaches the mirror in the period <i>T</i><sub><font size="1" style="font-size: 8pt"><i>1</i></font></sub>
and returns to the observers in the period <i>T</i><sub><font size="1" style="font-size: 8pt"><i>2</i></font></sub>,
they assume it was reflected at <i>(T</i><sub><font size="1" style="font-size: 8pt"><i>1</i></font></sub><i>
+ T</i><sub><font size="1" style="font-size: 8pt"><i>2</i></font></sub><i>)/2</i>
after the light was sent. Thus, they set their nearest clock so that
it would have read <i>0</i> at that moment. But since the measuring
rod is actually in absolute motion, the light does not reach the
mirror at the far end until it has passed both the length of the
measuring rod and whatever distance the rod travels during the first
leg (<i>T</i><sub><font size="1" style="font-size: 8pt"><i>1</i></font></sub>).
And on the return leg (<i>T</i><sub><font size="1" style="font-size: 8pt"><i>2</i></font></sub>),
light does not have to travel the whole distance of the measuring
rod, since the other end is also moving toward the light. But since
moving observers assume that the reflection occurs halfway through
the period required for the round trip, they are, in effect, assuming
that the set of simultaneous events lies on the line that runs
through the halfway point on the timeline for the clock at the
observers’ end of the measuring rod and the point of reflection at
the mirror on the timeline for the clock at the forward end of the
measuring rod. That is what moving observers take to be their
space-line as seen by us from the frame at absolute rest.</font></font></font></p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The result
of mis-synchronizing clocks is precisely the same diagram for the
moving frame that Minkowski constructed from his hyperboloid curve,
representing the conclusion of Einstein’s special theory. (The same
results would also follow from the Lorentz transformation equations.)
However, we have derived the moving observers’ apparent space-axis
(or space-line), not from a mysterious equation, but in a perfectly
intelligible way. The moving space-line is rotated upward in the
diagram, <i>because </i>the moving clocks have been mis-synchronized.
And they have been mis-synchronized because the moving observers have
followed Einstein’s definition of simultaneity at a distance, which
assumes that the velocity of light is the same both ways in every
direction relative to any inertial frame.</font></font></p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
amount of the error introduced by mis-synchronization will be as
important as its cause in the next step of this argument, so bear
with me for one final point. The home clock reading <i>0 </i>is one
event in absolute space and time, and the forward clock reading<i> 0
</i>is another event. The separation between them in the absolute
frame has a curious value, both in space and in time. The moving
measuring rod has a length of <i>L'</i>, but the distance in absolute
space between these two events turns out to be <i>L'/(1 - v</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>)</i>,
which means that the mis-synchronization makes it seem that the
moving measuring rod is <i>expanded </i>at the <i>square </i>of the
usual rate (see above diagram). The length of time between the two
events can be derived from the slope of the moving space-line in the
diagram for absolute space and time (that is, <i>v/c</i><sup><i>2</i></sup>)<i>.</i><sup><a class="sdendnoteanc" name="sdendnote1anc" href="#sdendnote1sym"><sup>i</sup></a>[1]</sup>
This is the slope of the tangent to Minkowski’s mysterious curve at
the point of intersection with the timeline for the observers’
nearest clock,<sup><a class="sdendnoteanc" name="sdendnote2anc" href="#sdendnote2sym"><sup>ii</sup></a>[2]</sup>
and it occurs in the second expression in the numerator for the
Lorentz transformation for time.<sup><a class="sdendnoteanc" name="sdendnote3anc" href="#sdendnote3sym"><sup>iii</sup></a>[3]</sup>
But in this context, the slope means that the difference in time
between the events is <i>v/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>[L'/(1
- v</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>)]</i>
(or the product of the slope of the moving space-line and the
distance between the points on it in absolute space). We will use
these values shortly.</font></font></font></p>
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><font face="Verdana, sans-serif">T<img src="data:image/png;base64,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" name="TtsOtkCLStr_15" align="right" hspace="5" width="350" height="29" border="0">he
Cause of the Apparent symmetry of Lorentz distortions. </font>Attempt
to detect absolute motion by measuring the rate of clocks and the
length of measuring rods on the other inertial frame are &quot;global
experiments,&quot; and the reason that absolute motion cannot be
detected is that the Lorentz distortions appear to be symmetrical.
Since transformation equations must work both ways between any two
inertial reference frames, this symmetry is entailed by Einstein's
argument for the Lorentz transformation equations in his special
theory of relativity. And this symmetry is an essential part of the
empirical equivalence of inertial frames that Poincaré called the
&quot;principle of relativity.&quot;</font></font></font></p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">If the
clocks and measuring rods were material objects in absolute space,
this symmetry would imply that clocks on two inertial frames passing
one another in space are both going slower than the other and that
their longitudinally-oriented measuring rods are both shorter than
one another. It is one of the reasons that Einsteinians must give up
the belief in absolute space and time. By the same token,
spatiomaterialism must explain this symmetry about pairs of inertial
frames as a <i>mere appearance</i> of space and matter as substances
enduring through time, just as the local equivalence was. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">This is the
part of the explanation of the empirical equivalence of inertial
frames that Lorentz left out of his Newtonian theory. But it is
readily supplied by the geometry of events in absolute space and
time. The apparent symmetry of the distortions is a result of the
actual Lorentz distortions suffered by the moving frame, together
with the mis-synchronization of moving clocks, as we can see by
considering how the measurements of the others’ clocks and rods are
made. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i>Length
contraction.</i> Consider first the apparent symmetry of length
contraction. The most direct way to measure the others’ standard of
length is to make simultaneous marks from both ends of one’s own
measuring rod onto the other inertial frame as it passes by and
compare that distance with the others’ measuring rod. This works
fine for absolute observers; they mark off a distance longer than
moving measuring rods lying in the direction of motion, indicating
that the moving measuring rods are contracted. But it also <i>seems
</i>to moving observers that absolute rods are contracted in the
direction of motion, and we can see why by considering what takes
place in making the measurement. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">It
is because (1) clocks on the moving frame have been mis-synchronized
and (2) moving measuring rods are contracted. We have just seen that
moving observers mis-synchronize their clocks when they accept
Einstein’s definition of simultaneity: the distance in absolute
space between the events at which moving clocks at both end of a
moving measuring rod read the same time is equal to an <i>expansion
</i>of the actually contracted measuring rod at the <i>square </i>of
the usual rate, that is, <i>(1 - v</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>)</i>.
Thus, when moving observers make what they think are simultaneous
marks on the absolute measuring rod that is passing by, they mark off
a distance on the absolute frame that is longer than their actually
contracted measuring rod by the square of the usual rate, and since
that distance is longer than the absolute measuring rod by the usual
rate, the absolute measuring rod seems to be contracted at the usual
rate.<sup><a class="sdendnoteanc" name="sdendnote4anc" href="#sdendnote4sym"><sup>iv</sup></a>[4]</sup>
</font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">In other
words, as the absolute inertial frame comes toward them, the
mis-synchronization of their clocks leads moving observers to make a
mark from the afterward end of their own measuring rod first and
then, after the moving frame has traveled some distance, they make a
second mark from the forward end, so that distance marked off on the
absolute frame includes both the length of the contracted moving
measuring rod and all the distance that the absolute frame travels
between making the two marks. That virtual expansion of the moving
measuring rod makes it appear that the absolute measuring rod is
contracted.<sup><a class="sdendnoteanc" name="sdendnote5anc" href="#sdendnote5sym"><sup>v</sup></a>[5]</sup>
</font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
error introduced by mis-synchronization is, in short, a virtual
distortion at the square of the usual rate, but in the opposite
direction, so that when the method of measuring combines it with the
actual shrinkage of the moving measuring rod, the effect is to make
absolute measuring rods seem distorted at the usual rate relative to
the moving rod. This same “geometrical mechanism” is at work in
the measurement of how fast the other’s clocks are ticking. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i>Time
dilation.</i> The most direct way for us to measure the speed of
clocks on the other inertial frame is for us to move <i>in our
inertial frame </i>along with one of the others’ clocks that is
passing by and to compare it with the series of clocks on our own
frame by which we will be passing. (Observers cannot take a clock
with them as they move through their own frame, because that would
make it a clock on the other frame. But nothing precludes observers
from keeping up with the other inertial frame and using clocks
already located at various points on their frame for the comparison.)
When observers on the frame at absolute rest keep up with the moving
clock and compare it with a series of their absolute clocks, they
observe the real slowing down of the others’ clock caused by its
absolute motion. The symmetry of the distortions means, however, that
when observers on a frame in absolute motion keep up with an absolute
clock and compare it with the series of their own moving clocks by
which they pass, the absolute clock <i>seems </i>to be slowed down. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">But
in the latter case, it is because (1) clocks on the moving frame have
been mis-synchronized, (2) the moving observers are moving backwards
on their own moving frame (<i>-v</i>) to keep up with the absolute
clock, and (3) clocks on the moving frame are slowed down. The amount
of deviation of a distant moving clock from absolute simultaneity
with a local moving clock is, as we saw, a function of the distance
in absolute space between the events at which two moving clocks have
the same readings, namely, <i>v/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup>
times the absolute distance (the slope of the rotated space line). In
this measurement, that distance depends on how long the moving
observer has been traveling at <i>-v</i>, that is, the distance <i>-vt'</i>.
Thus, the deviation of the next clock from absolute simultaneity will
be <i>VT</i> times <i>v/c</i><sup><i>2</i></sup><i>,</i><sup><font size="1" style="font-size: 8pt">
</font></sup>or <i>-t'(v</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>).</i>
That amount of time plus the time that elapses during the moving
observers trip from one clock to the next (that is, <i>t'</i>) yields
a total apparent time period of <i>t'&nbsp;-&nbsp;t'(v</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>)</i>,
or <i>t'(1 - v</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup><i>)</i>,
<i>which is a virtual speeding up of moving clocks at the square of
the usual rate of distortions</i>. Thus, since (1), the
mis-synchronization of moving clocks, combines with (2), the moving
observers’ motion on the moving frame, to produce, in effect, a
virtual speeding up of moving clocks at the <i>square </i>of the
usual rate, the result, when combined with (3), the actual slowing
down of moving clocks at the usual rate, is that the absolute clock
being compared with them appears slowed down at the usual rate.<sup><a class="sdendnoteanc" name="sdendnote6anc" href="#sdendnote6sym"><sup>vi</sup></a>[6]</sup><sup>,
</sup><sup><a class="sdendnoteanc" name="sdendnote7anc" href="#sdendnote7sym"><sup>vii</sup></a>[7]</sup>
</font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">In
sum, given how the measurements are made, the mis-synchronization of
moving clocks introduces a virtual distortion through which the
moving observers’ own distortions <i>are projected onto the
absolute inertial frame</i>. This can be seen in our diagram of
events happening to particular substances in absolute space and time,
for as we found, the mis-synchronization shows up as a rotation of
the moving space-line that involves both a virtual speeding up of
moving clocks and a virtual lengthening of moving measuring rods.
Thus, to see how it gives rise to the apparent symmetry of the
distortions, consider how the measurement of the others’ clock is
represented below. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">When
absolute observers keep up with the moving clock and compare it with
a series of their own clocks, they follow the moving timeline. When
the moving clock says <i>t'=1</i>, they compare it with an absolute
clock (located on that absolute space-line) which reads
<i>t=1/</i><img src="data:image/png;base64,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" name="StrEqBeta" align="bottom" width="46" height="18" border="0">(represented
by the horizontal line labeled <b>I</b> in the diagram). And when
moving observers travel backwards on their own frame to keep up with
the absolute clock, they follow the absolute timeline (<i>x=0</i>).
When they pass by their own moving clock reading <i>t'=1</i>, they
compare it with the absolute clock which reads <i>t=</i><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC4AAAASCAMAAAAT3xzTAAADAFBMVEUAAAABAQECAgIDAwMEBAQFBQUGBgYHBwcICAgJCQkKCgoLCwsMDAwNDQ0ODg4PDw8QEBARERESEhITExMUFBQVFRUWFhYXFxcYGBgZGRkaGhobGxscHBwdHR0eHh4fHx8gICAhISEiIiIjIyMkJCQlJSUmJiYnJycoKCgpKSkqKiorKyssLCwtLS0uLi4vLy8wMDAxMTEyMjIzMzM0NDQ1NTU2NjY3Nzc4ODg5OTk6Ojo7Ozs8PDw9PT0+Pj4/Pz9AQEBBQUFCQkJDQ0NERERFRUVGRkZHR0dISEhJSUlKSkpLS0tMTExNTU1OTk5PT09QUFBRUVFSUlJTU1NUVFRVVVVWVlZXV1dYWFhZWVlaWlpbW1tcXFxdXV1eXl5fX19gYGBhYWFiYmJjY2NkZGRlZWVmZmZnZ2doaGhpaWlqampra2tsbGxtbW1ubm5vb29wcHBxcXFycnJzc3N0dHR1dXV2dnZ3d3d4eHh5eXl6enp7e3t8fHx9fX1+fn5/f3+AgICBgYGCgoKDg4OEhISFhYWGhoaHh4eIiIiJiYmKioqLi4uMjIyNjY2Ojo6Pj4+QkJCRkZGSkpKTk5OUlJSVlZWWlpaXl5eYmJiZmZmampqbm5ucnJydnZ2enp6fn5+goKChoaGioqKjo6OkpKSlpaWmpqanp6eoqKipqamqqqqrq6usrKytra2urq6vr6+wsLCxsbGysrKzs7O0tLS1tbW2tra3t7e4uLi5ubm6urq7u7u8vLy9vb2+vr6/v7/AwMDBwcHCwsLDw8PExMTFxcXGxsbHx8fIyMjJycnKysrLy8vMzMzNzc3Ozs7Pz8/Q0NDR0dHS0tLT09PU1NTV1dXW1tbX19fY2NjZ2dna2trb29vc3Nzd3d3e3t7f39/g4ODh4eHi4uLj4+Pk5OTl5eXm5ubn5+fo6Ojp6enq6urr6+vs7Ozt7e3u7u7v7+/w8PDx8fHy8vLz8/P09PT19fX29vb39/f4+Pj5+fn6+vr7+/v8/Pz9/f3+/v7////isF19AAAAvUlEQVR4nJWRvRHDIAyFVbKDmwxAxwYZIwNoCdcMwQJZghUomYE1FH6EwRhythrd0/t44gDoUUHtd8o2/FG6XeN2gmO4YAF0ahJZbR2ulpthpmJTONA+9Lj3Z1zrATcJkJLVlwbcNPBFG+GO1VfAinF/TneC6tnkC0LXZNypt4znv/jkKW818S7GHTnJgGL2d4f6UvEjOfFINwU3sg/hEknAO/QG7Ks/xdHIOKxw8OOgbFvh0wG4K3nz/P/6AWEGw/I19lI/AAAAAElFTkSuQmCC" name="StrEqBeta" align="bottom" width="46" height="18" border="0">
(represented by the rotated moving space-line labeled II in the
diagram). The difference between these two measurements is obviously
due to the rotation of the moving space-line, which, as we have seen,
comes from mis-synchronizing moving clocks. Notice that the absolute
clock’s reading of <i>t=1</i> lies between these two comparisons.
Therein lies the power of mis-synchronization to cause the
appearance. Combining the slope induced in the moving space-line by
mis-synchronization (<i>v/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup>)
with the movement of the moving observers in making the measurement
(<i>x' = VT</i>, that is, keeping up with the absolute clock) is
equivalent to a temporal distortion on the moving frame at the square
of the rate of the actual distortion (<i>1-v</i><sup><i>2</i></sup><i>/c</i><sup><i>2</i></sup>),
but in the opposite direction. So, it combines with the actual
slowing down of moving clocks to make the absolute clock seem slowed
down relative to moving clocks. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img src="data:image/png;base64,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" name="StrAppDist" align="bottom" width="384" height="367" border="0"></font></p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
diagram also shows how the mis-synchronization is responsible for the
apparent symmetry of the contraction of measuring rods. But in this
case, it is the virtual expansion of the moving measuring rods
induced at the square of the usual rate by the mis-synchronization
that is relevant. When absolute observers make simultaneous marks on
the moving frame, they find that the moving measuring rod is
contracted at the usual rate (labeled III in the diagram). But when
moving observers make what they think are simultaneous marks on the
absolute frame, they actually mark off a distance that is expanded at
the square of the usual rate (labeled IV in the diagram). Once again,
the power of mis-synchronization can be seen in how the actual moving
measuring rod is contracted relative to the absolute measuring rod
and the virtual moving measuring rod is expanded relative to the
absolute rod, both at the usual rate. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The
symmetry of Lorentz distortions is, therefore, a symmetry betwen real
distortions in reference frames in absolute motion and apparent
distortions in the reference frame at absolute rest, and it is a
thoroughgoing symmetry, which holds for all the basic ways of
measuring the other frame's clocks and measuring rods. Indeed, any of
the standard measurements can made from either member of the pair of
inertial frames, though when they are considered from the point of
view of the other inertial observer, they reveal that the other's
clocks are speeded up and the other's measuring rods are expanded in
the direction of motion. This can be seen in the <font color="#0000ff"><u><a href="/F:/Philosophy/Existentialism/The%20Wholeness%20Of%20the%20World/www.twow.net/ObjText/"><font face="Arial, sans-serif"><font size="3" style="font-size: 12pt">table
of measurements</font></font></a></u></font>. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">This
explanation of the apparent symmetry of the kinematic distortions
also accounts for the apparent symmetry of the dynamic distortions
(though the longitudinal distortion in the force field is not always
recognized as such by Einsteinians), for the apparent increase in
absolute masses is implied by the false belief that absolute clocks
are slowed down and the assumption that Newton’s laws apply the
same way on all inertial frames (Einstein’s principle of
relativity). Likewise, the apparent decrease in longitudinal forces
is implied by Einstein’s principle of relativity and the false
belief that absolute measuring rods are contracted in the direction
of motion. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
apparent symmetry of the four distortions has been explained for the
special case in which one of the inertial frames is at absolute rest,
but it can be generalized to explain the apparent symmetry between
any two objects moving in absolute space. In the general case, the
rate of the apparent distortions is a function of their (apparent)
relative velocity, and what is detected on both sides is partly a
result of real distortions and partly illusions caused in the way
described above.<sup><a class="sdendnoteanc" name="sdendnote8anc" href="#sdendnote8sym"><sup>viii</sup></a>[8]</sup>
</font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Though
observers on any pair of inertial frames agree about their relative
velocity, it is worth noting that, on the spatiomaterialist
explanation of the empirical equivalence, their measurements of
relative velocity do not coincide with their real velocity relative
to one another in absolute space: the apparent relative velocity is
never more than the velocity of light, but the real velocity of
inertial frames relative to one another can approach twice the
velocity of light, because light moves at that velocity in opposite
directions from any given point in absolute space. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>Conclusions.</b></i>
One part of the promise made in <font face="Arial, sans-serif">Spatiomaterialism</font>
in order to use this ontology as a foundation for demonstrating
necessary truths has been kept. We have seen that spatiomaterialism
can explain the truth of Einstein’s special theory of relativity,
and means that nothing established empirically by Einstein’s theory
forces us to give up spatiomaterialism. Thus, if spatiomaterialism
can also explain the truth of Einstein’s general theory of
relativity (and quantum mechanics), physics will provide no grounds
for doubting that spatiomaterialism is the best ontological
explanation of the world. But there are a few implications of this
ontological explanation of special relativity that should be noted in
conclusion. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">First,
though we have discovered the power of absolute velocity to cause
changes in material objects by following in the footsteps of Lorentz,
that does not mean that we must postulate an ether in addition to
absolute space. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Lorentz and
Poincaré both expected to explain time dilation and length
contraction as the result of an interaction between material objects
and an ether at rest in absolute space (as if material objects were
made of nothing but electrons that interact with the electromagnetic
ether as they move through it). Though material objects must also
have something to interact with on our explanation of the Lorentz
distortions, we can take it to be space itself. We have postulated
space as a substance that contains matter, and having already used
that relationship to explain the truth of the laws of classical
physics, we now use it to explain the Lorentz distortions. Indeed, I
have suggested reasons for expecting Lorentz distortions to occur
apart from what is necessary to make absolute motion undetectable. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Though
there is no luminiferous ether, there is still a medium of light
propagation, and it still makes sense to hold that there is an
inertial frame in which light has the same one-way velocities in
every pair of opposite directions. That will be important in our
explanation of the truth of Einstein's general theory of relativity,
because we will not always assume that the light medium is at
absolute rest in space. The aspect of space by which it serves as the
medium of light propagation is more complex than it appears now,
because we shall have to assume that the velocity of light varies
with location in space in a way that can be seen as depending on the
velocity of the light medium relative to space. It is as if the ether
were being accelerated in space, but even though that may suggest
that the light medium is an ether after all, we will still not
postulate an ethereal substance coinciding with space to explain this
phenomenon. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Second,
the difference between the actual Lorentz distortions in material
objects with absolute velocity and the apparent symmetry of Lorentz
distortions in pairs of inertial frames revealed by this ontological
explanation shows that the mathematical representation of special
relativity is hiding an aspect of reality. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The
mathematical way of saying that inertial frames are all equivalent is
to say that the laws of physics are covariant, or Lorentz covariant.
That means that laws of physics that apply in one frame take the same
form in any other inertial frame, that is, when they are subjected to
the Lorentz transformation. (This equivalence is what is represented
by Minkowski’s equation for the absolute separation between any two
events and is the foundation for the equations of four-vector
physics, which do not mention any specific inertial frame.)
Einstein’s original article showed that covariance holds in the
case of electromagnetism, and imposing covariance as a requirement on
other physical theories has generated predictions that turn out to be
true. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Despite the
obvious simplicity, comprehensiveness, elegance, and fruitfulness of
this mathematical representation of special relativity, however, it
is a mistake to take covariance to be the deepest and most complete
truth about the real nature of the world. Our ontological explanation
of the truth of special relativity reveals that covariance actually
represents two different phenomena, with two different ontological
causes. There is the local equivalence of inertial frames, which is
caused by the actual Lorentz distortions, and there is the global
equivalence, which is caused by the mis-synchronization of clocks and
how that makes one’s own Lorentz distortions appear to be in the
other inertial frame. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Third,
this ontological interpretation of the mathematical representations
used in special relativity confirms that the method of physics is
implicitly skeptical about ontological causes that are not entailed
by realism about its efficient cause explanations. </font></font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">When
physics infers to the best efficient-cause explanation, it looks for
laws of nature that represent the quantitative aspects of the
regularities involved, because such mathematical representations can
often be used to predict surprising, precise measurements that
confirm their truth. The empirical method of science is so dependent
on mathematical representations that, once experiments have confirmed
their predictions, physicists are realists about their
efficient-cause explanations. They let scientific realism determine
their ontology. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Accordingly,
the belief in spacetime is simply realism about special relativity.
That is, substantivalism about spacetime is the ontology that results
from taking the simplest mathematical theory that can predict all the
relevant phenomena to correspond to what exists. Since the special
relativity holds that all inertial frames are empirically equivalent,
scientific realism takes the empirical equivalence among inertial
frames to be an ontological equivalence. That is to replace absolute
space and time with spacetime. But it is also the leave out an aspect
of reality, for it is to ignore the observable fact that only the
present exists. </font></font>
</p>
<p lang="en-US" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; text-indent: 0cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Finally,
the principle of relativity itself turns out to be merely a practical
principle, without ontological significance. Though as a practical
matter, the assignment of coordinates to events can be made only
relative to an inertial frame whose absolute motion cannot be known,
that does not mean that they do not have actual locations in absolute
space as time passes. There is an absolute truth about the dates and
places of events. Even though we can never know what they are, we can
know that there is a fact of the matter about when and where they
occur. That is what is implied by this ontological reduction of
special relativity. I have called it an explanation of empirical
equivalence, because by explaining the <i>apparent </i>truth of the
principle of relativity, it denies that this relativity is a basic
principle of physics.<sup><a class="sdendnoteanc" name="sdendnote9anc" href="#sdendnote9sym"><sup>ix</sup></a>[9]</sup>
</font></font></font>
</p>
<div id="sdendnote1">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote1sym" href="#sdendnote1anc">i</a><sup>[1]</sup>
	The slope of the moving space-line is found in the Newtonian diagram
	of space and time by calculating the difference between the absolute
	time of reflection, <i>T</i><sub><font size="1" style="font-size: 8pt"><i>1</i></font></sub>,
	and the time halfway during the round trip, <i>(T</i><sub><font size="1" style="font-size: 8pt"><i>1
	</i></font></sub><i>+ T</i><sub><font size="1" style="font-size: 8pt"><i>2</i></font></sub><i>)/2,</i>
	calculating the absolute distance between those events, and dividing
	the latter into the former. 
	</p>
</div>
<div id="sdendnote2">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote2sym" href="#sdendnote2anc">ii</a><sup>[2]</sup>
	In Minkowski’s derivation, the slope is the value of the first
	derivative of his equation for the hyperbola when <i>t = x/v </i>(i.e.,
	when 
	<img src="data:image/png;base64,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" name="StrEqXvsc" align="bottom" width="80" height="35" border="0">),
	or <i>v/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup>.
	And the length of the unit of distance on the moving space-line is
	the distance required for light to have velocity <i>c</i>, that is,
	the distance light actually travels in a unit of time according to
	slowed-down clocks, which in terms of the length of the contracted
	rod, <i>L'</i>, is also 
	<img src="data:image/png;base64,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" name="StrEqLPrime" align="bottom" width="50" height="31" border="0">,
	or an effective expansion of the measuring rod at the square of the
	usual rate.</p>
</div>
<div id="sdendnote3">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote3sym" href="#sdendnote3anc">iii</a><sup>[3]</sup>
	The Lorentz transformation equations that Einstein derived also
	imply that the others’ space-line at the point of coincidence of
	origins is represented by the line, <i>t = vx/c</i><sup><font size="1" style="font-size: 8pt"><i>2</i></font></sup>.
	Solve the moving observer's Lorentz transformation equations for
	both time and space on the assumption that <i>t' = 0</i> (the moving
	space-line through the absolute origin) and combine.</p>
</div>
<div id="sdendnote4">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote4sym" href="#sdendnote4anc">iv</a><sup>[4]</sup>
	Mathematically, where <i>L</i> is the absolute measuring rod, <i>L'=L<img src="data:image/png;base64,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" name="StrEqBeta" align="bottom" width="46" height="18" border="0"></i>
	is the actually contracted moving measuring rod and <i>L&quot;=<img src="data:image/png;base64,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" name="StrEqLPrime" align="bottom" width="50" height="31" border="0">
	</i>is the virtually expanded moving measuring rod, we know that
	<i>L=L&quot;<img src="data:image/png;base64,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" name="StrEqBeta" align="bottom" width="46" height="18" border="0"></i>,
	and since moving observers mistakenly assume that <i>L</i>'<i>=L&quot;,
	</i>that is the appearance that the absolute measuring rod is
	contracted relative to the moving measuring rod.</p>
</div>
<div id="sdendnote5">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote5sym" href="#sdendnote5anc">v</a><sup>[5]</sup>
	Measuring rods can also be measured with clocks, by timing how long
	it takes for the others’ measuring rod to pass by traveling at <i>v</i>.
	The absolute observers’ measurement is veridical, but the
	appearance to moving observers that absolute measuring rods are
	contracted results from using slowed down clocks.
	Mis-synchronization is also implicated in this appearance, for it is
	what gives moving observers the correct value for relative velocity,
	despite having slowed-down clocks and contracted measuring rods.</p>
</div>
<div id="sdendnote6">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote6sym" href="#sdendnote6anc">vi</a><sup>[6]</sup>
	 Measuring rods can also be used to time the others’ clock, by
	moving along with the other clock and comparing it with what clocks
	should read after traveling at the relative velocity, <i>v</i>, for
	a certain distance on our frame. Again, the absolute observers’
	measurement is veridical, but the absolute clock seems slowed down
	to moving observers because their measuring rods are contracted. 
	And mis-synchronizing clocks again plays a role in obtaining the
	correct value for relative velocity.</p>
</div>
<div id="sdendnote7">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote7sym" href="#sdendnote7anc">vii</a><sup>[7]</sup>
	This calculation of the effect of the mis-synchronization of moving
	clocks on the moving observers measurements of the speed of absolute
	clocks is also an interpretation of what is actually going on when
	one derives a prediction from the Lorentz transformation equations
	of what moving observers will find about absolute clocks. Assuming
	that the primed variables, <i>t'</i> and <i>x'</i>, are those used
	by the moving observers, then the Lorentz transformation equation by
	which moving observers determine temporal coordinates in the
	absolute frame for time is 
	<img src="data:image/png;base64,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" name="StrEqTimeDer" align="bottom" width="78" height="38" border="0">.
	But since the observers’ motion is <i>x' = VT</i>, this equation
	becomes 
	<img src="data:image/png;base64,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" name="StrEqTimeDil" align="bottom" width="79" height="38" border="0">.
	The denominator represents the slowing down of moving clocks at the
	usual rate; the numerator represents the result of moving backwards
	past a series of mis-synchronized clocks, an effective speeding up
	of clocks at the square of the usual rate; and so the partial
	cancellation of the numerator by the denominator represents how they
	give rise to the opposite appearance, an apparent slowing down of
	the absolute clocks at the usual rate. This shows, at least, that
	there are factors of the right size working in the right way to
	produce the appearance. 
	</p>
	<p lang="en-US" class="sdendnote-western">	In this case, the
	deduction for moving observers happens to correspond to the cause of
	the apparent distortion in the absolute frame, but the deduction
	does not always corresponds to the cause of the observation. It
	can’t because the deduction predicting time dilation is the same
	on both sides of any pair of frames. But there is a more complete
	symmetry among distortions involving opposite distortions on each
	side, and one of the two kinds of deductions predicting them always
	involves a mis-synchronization factor and the other does not,
	suggesting there are always two ways that measurements of
	distortions can be caused, namely, by real distortions and by the
	appearance caused by mis-synchronization. 
	</p>
</div>
<div id="sdendnote8">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote8sym" href="#sdendnote8anc">viii</a><sup>[8]</sup>
	The relative velocity of a third moving frame relative to the first
	frame is given by Einstein’s formula for the addition of
	velocities, 
	<img src="data:image/png;base64,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" name="StrEqRelVPlus" align="bottom" width="70" height="28" border="0">,
	where <i>v</i> is the velocity of  the second frame relative to the
	first and <i>w</i> is the velocity of the third frame relative to
	the second. This formula is derived by using the Lorentz equations
	to transform the second frame’s description of the motion of the
	third frame into a first frame’s description. But if the second
	frame is at absolute rest, this formula yields the apparent relative
	velocity of two frames as a function of their absolute velocities:
		<img src="data:image/png;base64,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" name="StrEqRelVMinus" align="bottom" width="72" height="28" border="0">(since
	 <i>-v</i> is the absolute velocity of the first frame when <i>v</i>
	is the velocity of the second frame relative to the first). This
	formula for the “subtraction of velocities” describes how
	observers on two frames moving through a third must appear to one
	another. There is no reason for Newtonians not to use the Lorentz
	transformation equations as an aid to calculation, since there is no
	dispute about the predictions, only about the causes. The apparent
	relative velocity is not, in general, the real relative velocity, <i>u
	- w</i>, because the latter can approach twice the velocity of
	light.</p>
</div>
<div id="sdendnote9">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm"><a class="sdendnotesym" name="sdendnote9sym" href="#sdendnote9anc">ix</a><sup>[9]</sup>
	The equation derived from the special theory of relativity
	describing the quantitative equivalence between energy and mass, <i>E
	= mc</i><sup><i>2</i></sup>, is the foundation for the principle of
	the conservation of mass and energy which was used as the working
	hypothesis in the ontological explanation of classical physics.</p>
</div>
</body>
</html>