About the accuracy within which the
By W. de Sitter
independence of the speed of light from the
movement of the source can be stated.
Translated from Physik. Zeitschr. 14, 1267, (1913)
This is a Google.com translation that is being smoothed.
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Installed 03 Jun 2004.Latest update 27 Nov 2011.
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In Proc. Amst. Acad. February 1913 (volume 15, p. 1297) and
this journal 14, 429, 1913 I showed that the existence of
spectroscopic binary stars, whose movements follow Kepler's laws, in which
the choice is between the light theories of Ritz (emission theory) and
Lorentz (constant speed of light), decides in favor of the latter.
v = c + ku.
If only k = 0 (Lorentz) or k = 1 (Ritz) are permissible, then the choice
is unambiguous. Even if one permits intermediate values of k , then
the question an upper limit is to be intended for k. One can never
experimentally maintain a constant of any [certain] size, but only a
constant within certain limits.
If one leaves the point of view that only between these two theories is
to be selected, then the question evolves into another. The law for the
speed of light in the direction of the source then becomes e.g.
As Mr. P. Guthnick (Astr. Nachr. 195, p. 265) and Mr. E.
Freundlich (this journal 14, 835)
emphasize, in the motion an
apparent eccentricity very correctly will arise, [whose] proportionally
is , also , where
is the maximum for
With regard to finding an upper limit for k we take e.g. a
well-known star like
The observational data are:
We set as upper limits, which are still permissible by the inaccuracy
of the observations: thus one finds:
thus one finds:
k < 0.002 .
Perhaps other stars will give still smaller values. Naturally the smallest
values [are] supplied by the stars with the smallest parallaxes.
Unfortunately the parallaxes for most stars are still unknown. There is
however a large number of spectroscopic binary stars
with large speeds and small or infinitesimal eccentricity, and it cannot be
doubted the fact that the majority of these stars have small parallaxes and
therefore will give still many smaller values for k than
this star was selected, because its parallax is well known and therefore
is relatively large.
Mr. Freundlich emphasizes that the statistics of the spectroscopic
binary stars exhibits a certain preference of the lines of apsides
for a direction toward the sun. That would speak for the hypothesis of
a measurable value of k. There is however another statistical
fact, which is by far more authentic, according to my opinion, which
speaks against it. That is already emphasized by Mr. Guthnick. The
spectroscopic binary stars with short period,
thus large u, have
small or infinitesimal eccentricities, while those with long periods
and the visual binary stars have generally larger eccentricities.
If k had a rather high value, this would have to be
the other way around.
The small value of the upper limit for k, found above, seems to make
however all further views of this kind redundant.
Leiden, October 1913.
(Received 28 October 1913.)
Eccentricity vs Period for Spectroscopic Binary Stars
Thanks to Tom Yee, ADAM27, Jerry "Cephalobus" and Frank Zenker for corrections.
For some 1908 information about the calculated orbits of spectroscopic
binary stars exhibiting a directional grouping for their lines of apsides,
and for their eccentricities versus orbit speeds,
see: J. Miller Barr (1908) and a
Truncated version of Barr's article. [Added 02 May 2010.]
See an English Translation of Freundlich's article. [doc file] - [Added 11 July 2011.] Thanks to Mr. Tom Miles for the pdf copy of Freundlich's article. Freundlich cites Barr. [Added 13 Jan 2011.]
Shade Tree Physics.