Objectivity versus
relativity
28.4 The derivation of the length contraction
The Lorentz transformation is the result of a purely mathematical problem. Stimulated by
the surprisingly result of the Michelson experiment the Dutchman Hendrik A. Lorentz
1891 asked himself, how the equations of the Galilei-transformation would have to look
like, if the propagation of light wouldn't be infinitely fast but finite and constant. He
thereby proceeds from the assumption of two inertial systems moving against one another
with a not accelerated velocity v, in which the laws of Newtonian physics are equally
valid
. As a result of the relative motion a change of the length measures will occur.
This at first can be explained as a purely geometric effect in the context of nonrelativistic
physics. We imagine a vehicle, which is on
its way with constant velocity, and emits an
optical or acoustical signal. Sideways in the countryside is standing in a perpendicularly
measured distance L a reflector (mirror), which sends the signal back again. The velocity
of the signal however isn't infinitely fast and from that follows that the vehicle during the
propagation time of the signal as well has moved a bit further. The actual way, which the
signal had to cover now amounts to L
o
(> L). The distance measure thus is observed
smaller as it is in reality, to be specific for the factor of the square root of Lorentz (fig.
28.4).
(28.16)
According to the principle of relativity it doesn't play a role, if the vehicle is driving or if
it is standing still and the mirror is moving with a linear uniform velocity.
Initially Einstein also only spoke of an observable length contraction, which must not
necessarily occur in reality, an optical deception so to speak. Lorentz however proceeded
from the assumption of a physical length change, thus a length change existing in reality,
what in practice at first makes no difference. If e.g. at relativistic velocities a rocket
becomes smaller, then the pilot equally shrinks, so that it would not be possible to notice a
present difference.
If however the observer stands outside the events and takes a ,,neutral standpoint", then he
will be able to see, which interpretation is the right one. Today some examples are known.
In accelerators particles at relativistic fast velocities actually get smaller for the factor of
the square root of Lorentz. That has been proven and this result afterwards gives the
Dutchman Lorentz right! The followers of the physical length contraction also are called
Neo-Lorentzians.
In the vicinity of a gravitational mass the speed of light becomes so slow, that the
shortening factor plays a role and space is curved towards the mass. To understand this
shortening of scale, the influence of the field also should be considered.
: Example: In a closed lift physical experiments are being carried out.
Accelerations of the lift have an influence on the experiments. However no
influence can be detected, if the lift is standing still or is moving with
constant velocity. It with that fulfills the conditions of an inertial system.
The question is: what do the experiments show someone standing outside,
whom the lift passes by?
580
The dependence of the Lorentz contraction on the field
From the comparison of the Lorentz contraction
(28.16)
with the field dilatation (28.14 and 28.15)
follows
(28.17)
the proportionality (length measures depending on field):
E, H ~ 1/L
2
and Eo, Ho ~ l/L
0
2
(28.18)
Experimental examples
< i >
:
•
Electrostriction (piezo speaker)
•
Magnetostriction
•
Field or gravitational lenses
•
Curvature of space, deflection of light
Conclusion
:
•
The field determines the length measures (what is 1 meter)
•
The field determines the velocities v (in m/s)
•
The field determines the speed of light c [m/s]
•
Measurement of the speed of light is made with itself:
(28.19)
•
Measured is a constant of measurement c = 300.000 km/s
•
The speed of light c is not a constant of nature!
Fig. 28.5: The dependence of the Lorentz contraction on the field
: see part 1, chap. 6.10
: see part 1, chap. 6.11
Objectivity versus relativity
581
28.5 The dependence of the Lorentz contraction on the field
The two results of the field dilatation (28.14 and 28.15) and of the Lorentz contraction
(28.16) must be brought together and compared (28.17). Doing so the mathematical
expression of the square root of Lorentz is cancelled out. That is of utmost importance,
since with that also all limits disappear and there remains a purely physical relation, a
proportionality of utmost importance (28.18).
What was the sense of the limits associated with the introduction of so-called inertial
systems, which are the basis of the Lorentz transformation and which were adopted for our
derivation of the field dilatation? They now only are auxiliary considerations according to
model. We have chosen a very simple model, which can be described mathematically, in
which an observer holds in his hand gauges for distances and field strengths and with that
gauges a system flying by with constant velocity. He on the one hand determines a length
contraction and on the other hand a field dilatation. He compares both with each other and
comes to the conclusion: The field determines the dimensions!
This statement is purely physical and it is generally valid. It is independent of the relative
velocity and all other mathematical conditions. A centrally accelerated circular motion e.g.
will falsify the length contraction to the same extent, as the at the same time occurring
field dilatation. It can be expected, that in addition to the square root of Lorentz also other
errors will mutually efface, so that a generalization in this case actually seems to be
allowed.
The won proportionality is of most elementary importance. We use it in the case of the
piezo speaker and know it from the curvature of space and deflection of light in presence
of extreme fields. If we ourselves however are exposed to the field as an observer, in
which also the object to be observed is situated, then we are in the dilemma, not being able
to perceive the influence. If we, to stay with the example, would sit in a rocket and this
would become smaller at faster velocity, then we would notice nothing, since we also
would shrink along to the same extent.
That concerns every measurement of velocity in general and the speed of light c in
particular, which as is well-known is measured in meters per second. But if the field
determines c and in the same way the length measure, which is given in meters, then both
stand in a direct proportionality to each other, then we won't have the slightest chance to
measure the speed of light. If namely c is changed, then this concerns the measurement
path in the same way. Now the variable is measured with itself and as a result appears c, a
constant value. We neither can see the change, since our eyes scan all objects optically and
that means with c.
It is the nightmare of each and every measurement engineer, if the gauge depends on the
factor to be measured. No wonder, if the theorem of addition of the velocities apparently
loses its validity and always the same c is being measured, independent of the direction in
which the source of radiation is moving (chap. 6.11). The result is:
The speed of light is a constant of measurement and not a constant of nature!
If however the light is scanned with the speed of light, then also all components of the
light vector correlated with themselves result in the same constant value c, then actually
the vector of the speed of light loses its orientation in space and becomes a scalar factor.
The Maxwell equations already anticipate this circumstance, but without providing an
explanation why this is correct. Only the new field approach can answer the open
question. With the derivation an axiom of physics - one also can say stumbling block -
has been overcome.