The '''aberration of light''' (also referred to as '''astronomical aberration''' or '''stellar aberration''') is an astronomical phenomenon which produces an [[apparent motion]] of celestial objects. It was discovered and later explained by the third [[Astronomer Royal]], [[James Bradley]], in [[1725]], who attributed it to the finite [[speed of light]] and the motion of [[Earth]] in its orbit around the [[Sun]].<ref name="Hirshfeld">{{cite book |last=Hirschfeld |first=Alan |authorlink= |title=Parallax:The Race to Measure the Cosmos |year=2001 |publisher=Henry Holt |location=New York, New York |isbn=0-8050-7133-4}} </ref>
At the instant of any observation of an object, the apparent position of the object is displaced from its true position by an amount which depends upon the transverse component of the [[velocity]] of the observer, with respect to the vector of the incoming beam of light (i.e., the line actually taken by the light on its path to the observer). In the case of an observer on Earth, the direction of its velocity varies during the year as Earth [[orbital revolution|revolves]] around the Sun (or strictly speaking, the [[barycenter]] of the [[solar system]]), and this in turn causes the apparent position of the object to vary. This particular effect is known as '''annual aberration''' or '''stellar aberration''', because it causes the apparent position of a star to vary periodically over the course of a year. The maximum amount of the aberrational displacement of a star is approximately 20 [[arcsecond]]s in [[right ascension]] or [[declination]]. Although this is a relatively small value, it was well within the observational capability of the instruments available in the early eighteenth century.
Aberration should not be confused with [[Parallax#Stellar parallax|stellar parallax]], although it was an initially fruitless search for parallax that first led to its discovery.<ref name="Hirshfeld"/> Parallax is caused by a change in the position of the observer looking at a relatively nearby object, as measured against more distant objects, and is therefore dependent upon the distance between the observer and the object.<ref name="Hirshfeld"/>
In contrast, stellar aberration is ''independent'' of the distance of a celestial object from the observer, and depends only on the observer's ''instantaneous transverse velocity'' with respect to the incoming light beam, at the moment of observation. The light beam from a distant object cannot itself have any transverse velocity component, or it could not (by definition) be seen by the observer, since it would miss the observer. Thus, any transverse velocity of the emitting source plays no part in aberration. Another way to state this is that the emitting object ''may'' have a transverse velocity with respect to the observer, but any light beam emitted from it which reaches the observer, cannot, for it must have been previously emitted in such a direction that its transverse component has been "corrected" for. Such a beam must come "straight" to the observer along a line which connects the observer with the position of the object when it emitted the light.<ref name="Hirshfeld"/>
Aberration should also be distinguished from [[light-time correction]], which is due to the motion of the observed object, like a [[planet]], through space during the time taken by its light to reach an observer on Earth. Light-time correction depends upon the velocity and distance ''of the emitting object'' during the time it takes for its light to travel to Earth. Light-time correction does not depend on the motion of the Earth—it only depends on Earth's ''position'' at the instant when the light is observed. Aberration is usually larger than a planet's light-time correction except when the planet is near [[quadrature]] (90° from the Sun), where aberration drops to zero because then the Earth is directly approaching or receding from the planet. At [[opposition (astronomy)|opposition]] to or [[conjunction (astronomy and astrology)|conjunction]] with the Sun, aberration is 20.5" while light-time correction varies from 4" for [[Mercury (planet)|Mercury]] to 0.37" for [[Neptune]] (the Sun's light-time correction is less than 0.03").
== Explanation ==
It has been stated above that aberration causes a displacement of the apparent position of an object from its true position. However, it is important to understand the precise technical definition of these terms.
===Apparent and true positions===
[[image:Aberration1.svg|frame|right|Figure 1. Diagram illustrating stellar aberration]]
The '''apparent position''' of a star or other very distant object is the direction in which it is seen by an observer on the moving Earth. The '''true position''' (or '''geometric position''') is the direction of the straight line between the observer and star at the instant of observation. The difference between these two positions is caused mostly by aberration.
Aberration occurs when the observer's [[velocity]] has a component that is [[perpendicular]] to the line traveled by light between the star and observer. In Figure 1 to the right, '''S''' represents the '''s'''pot where the star light enters the telescope, and '''E''' the position of the '''e'''ye piece. If the telescope does not move, the true direction of the star relative to the observer can be found by following the line '''ES'''. However, if Earth, and therefore the eye piece of the telescope, moves from '''E''' to '''E’''' during the time it takes light to travel from '''S''' to '''E''', the star will no longer appear in the center of the eye piece. The telescope must therefore be adjusted so that the star light enters the telescope at spot '''S’'''. Now the star light will travel along the line '''S’E’''' and reach '''E’''' exactly when the moving eye piece also reaches '''E’'''. Since the telescope has been adjusted by the angle '''SES’''', the star's apparent position is hence displaced by the same angle.
===Moving in the rain===
Many find aberration to be counter-intuitive, and a simple thought experiment based on everyday experience can help in its understanding. Imagine you are standing in the rain. There is no wind, so the rain is falling vertically. To protect yourself from the rain you hold an umbrella directly above you.
Now imagine that you start to walk. Although the rain is still falling vertically (relative to a stationary observer), you find that you have to hold the umbrella slightly in front of you to keep off the rain. Because of your forward motion relative to the falling rain, the rain now appears to be falling not from directly above you, but from a point in the sky somewhat in front of you.
The deflection of the falling rain is greatly increased at higher speeds. When you drive a [[car]] at night through falling rain, the rain drops illuminated by your car's [[headlight]]s appear to fall from a position in the sky well in front of your car.
==Types of aberration==
There are a number of types of aberration, caused by the differing components of the Earth's motion:
* '''Annual aberration''' is due to the revolution of the Earth around the [[Sun]].
* '''Planetary aberration''' is the combination of aberration and light-time correction.
* '''Diurnal aberration''' is due to the [[rotation]] of the Earth about its own axis.
* '''Secular aberration''' is due to the motion of the Sun and [[solar system]] relative to other stars in the [[galaxy]].
===Annual aberration===
As the Earth revolves around the Sun, it is moving at a velocity of approximately 30 km/s. The speed of light is approximately 300,000 km/s. In the special case where the Earth is moving perpendicularly to the direction of the star (i.e. if '''SEE’''' in the diagram is 90 degrees), the angle of displacement, '''SES’''', would therefore be (in [[radian]]s) the ratio of the two velocities, i.e. 1/10000 or about 20.5 [[arcsecond]]s.
This quantity is known as the ''constant of aberration'', and is conventionally represented by ''κ''. Its precise accepted value is 20".49552 (at [[J2000]]).
[[image:Aberration3.png|frame|left|Figure 2. Diagram illustrating the effect of annual aberration on the apparent position of three stars at ecliptic longitude 270 degrees, and ecliptic latitude 90, 45 and 0 degrees, respectively]]
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The plane of the Earth's orbit is known as the [[ecliptic]]. Annual aberration causes stars exactly on the ecliptic to appear to move back and forth along a straight line, varying by ''κ'' on either side of their true position. A star that is precisely at one of the ecliptic's poles will appear to move in a circle of radius ''κ'' about its true position, and stars at intermediate ecliptic latitudes will appear to move along a small [[ellipse]] (see figure 2).
A special case of annual aberration is the nearly constant deflection of the Sun from its true position by ''κ'' towards the ''west'' (as viewed from Earth), opposite to the apparent motion of the Sun along the ecliptic. This constant deflection is often erroneously explained as due to the motion of the Earth during the 8.3 minutes that it takes light to travel from the Sun to Earth: this is a valid explanation provided it is given in the Earth's reference frame, whereas in the Sun's reference frame the same phenomenon must be described as aberration of light. Hence it is not a coincidence that the angle of annual aberration be equal to the path swept by the Sun along the ecliptic in the time it takes for light to travel from it to the Earth (8.316746 minutes divided by one sidereal year (365.25636 days) is 20.49265", very close to ''κ''). Similarly, one could explain the Sun's apparent motion over the background of fixed stars as a (very large) parallax effect.
Aberration can be resolved into east-west and north-south components on the [[celestial sphere]], which therefore produce an apparent displacement of a star's [[right ascension]] and [[declination]], respectively. The former is larger (except at the ecliptic poles), but the latter was the first to be detected. This is because very accurate clocks are needed to measure such a small variation in right ascension, but a [[transit telescope]] calibrated with a [[plumb-bob|plumb line]] can detect very small changes in declination.
[[image:Aberration2.gif|frame|left|Figure 3. Diagram illustrating aberration of a star at the north ecliptic pole]]
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Figure 3, above, shows how aberration affects the apparent declination of a star at the north ecliptic pole, as seen by an imaginary observer who sees the star transit at the [[zenith]] (this observer would have to be positioned at [[latitude]] 66.6 degrees north – i.e. on the [[arctic circle]]). At the time of the March [[equinox]], the Earth's orbital velocity is carrying the observer directly south as he or she observes the star at the zenith. The star's apparent declination is therefore displaced to the south by a value equal to ''κ''. Conversely, at the September equinox, the Earth's orbital velocity is carrying the observer northwards, and the star's position is displaced to the north by an equal and opposite amount. At the June and December [[solstice]]s, the displacement in declination is zero. Likewise, the amount of displacement in [[right ascension]] is zero at either [[equinox]] and maximum at the [[solstice]]s.
Note that the effect of aberration is out of [[phase (waves)|phase]] with any displacement due to parallax. If the latter effect were present, the maximum displacement to the south would occur in December, and the maximum displacement to the north in June. It is this apparently anomalous motion that so mystified Bradley and his contemporaries.
===Planetary aberration===
Planetary aberration is the combination of the aberration of light (due to Earth's velocity) and [[light-time correction]] (due to the object's motion and distance). Both are determined at the instant when the moving object's light reaches the moving observer on Earth. It is so called because it is usually applied to planets and other objects in the solar system whose motion and distance are accurately known.
===Diurnal aberration===
Diurnal aberration is caused by the velocity of the observer on the surface of the rotating Earth. It is therefore dependent not only on the time of the observation, but also the [[latitude]] and [[longitude]] of the observer. Its effect is much smaller than that of annual aberration, and is only 0".32 in the case of an observer at the equator, where the rotational velocity is greatest.
===Secular aberration===
The Sun and solar system are revolving around the center of the Galaxy, as are other nearby stars. It is therefore possible to conceive of an aberrational effect on the apparent positions of other stars and on [[extragalactic astronomy|extragalactic]] objects. However, the change in the solar system's velocity relative to the center of the Galaxy varies over a very long timescale, and the consequent change in aberration would be extremely difficult to observe. Therefore, this so-called ''secular aberration'' is usually ignored when considering the positions of stars.
However, it is possible to estimate the displacement between the apparent and true position of a nearby star whose distance and motion are known. Newcomb<!--- (p. 170) ---> gives the example of [[Groombridge 1830]], where he estimates that the true position is displaced by approximately 3 [[arcminutes]] from the direction in which we observe it. This calculation also includes an allowance for light-time correction, and is therefore analogous to the concept of planetary aberration.
==Historical background==
The discovery of the aberration of light in [[1725]] by [[James Bradley]] was one of the most important in astronomy. It was totally unexpected, and it was only by extraordinary perseverance and perspicuity that Bradley was able to explain it in [[1727]]. Its origin is based on attempts made to discover whether the stars possessed appreciable [[parallax]]es. The [[Copernicus|Copernican]] theory of the [[solar system]] – that the Earth revolved annually about the Sun – had received confirmation by the observations of [[Galileo Galilei|Galileo]] and [[Tycho Brahe]] (who, however, never accepted [[heliocentrism]]), and the mathematical investigations of [[Johannes Kepler|Kepler]] and [[Isaac Newton|Newton]].
===Search for stellar parallax===
As early as [[1573]], [[Thomas Digges]] had suggested that this theory should necessitate a parallactic shifting of the stars, and, consequently, if such stellar parallaxes existed, then the Copernican theory would receive additional confirmation. Many observers claimed to have determined such parallaxes, but Tycho Brahe and [[Giovanni Battista Riccioli]] concluded that they existed only in the minds of the observers, and were due to instrumental and personal errors. In [[1680]] [[Jean Picard]], in his ''Voyage d’[[Uraniborg|Uranibourg]],'' stated, as a result of ten [[year]]s' observations, that [[Polaris]], or the [[Pole Star]], exhibited variations in its position amounting to 40" annually. Some astronomers endeavoured to explain this by parallax, but these attempts were futile, for the motion was at variance with that which parallax would produce.
[[John Flamsteed]], from measurements made in [[1689]] and succeeding years with his mural quadrant, similarly concluded that the declination of the Pole Star was 40" less in July than in September. [[Robert Hooke]], in [[1674]], published his observations of γ [[Draco (constellation)|Draconis]], a star of [[apparent magnitude|magnitude]] 2<sup>m</sup> which passes practically overhead at the latitude of [[London]], and whose observations are therefore free from the complex corrections due to astronomical [[refraction]], and concluded that this star was 23" more northerly in July than in October.
===Bradley's observations===
When James Bradley and [[Samuel Molyneux]] entered this sphere of astronomical research in [[1725]], there consequently prevailed much uncertainty whether stellar parallaxes had been observed or not; and it was with the intention of definitely answering this question that these astronomers erected a large telescope at the house of the latter at [[Kew]].<ref name="Hirshfeld"/> They determined to reinvestigate the motion of γ Draconis; the telescope, constructed by [[George Graham (clockmaker)|George Graham]] (1675-1751), a celebrated instrument-maker, was affixed to a vertical chimney stack, in such manner as to permit a small oscillation of the eyepiece, the amount of which (i.e. the deviation from the vertical) was regulated and measured by the introduction of a screw and a plumb line.
The instrument was set up in November 1725, and observations on γ Draconis were made on the [[December 3|3rd]], [[December 5|5th]], [[December 11|11th]], and [[December 12|12th of December]]. There was apparently no shifting of the star, which was therefore thought to be at its most southerly point. On [[December 17]], however, Bradley observed that the star was moving southwards, a motion further shown by observations on the [[December 20|20th]]. These results were unexpected and inexplicable by existing theories. However, an examination of the telescope showed that the observed anomalies were not due to instrumental errors.
The observations were continued, and the star was seen to continue its southerly course until March, when it took up a position some 20" more southerly than its December position. After March it began to pass northwards, a motion quite apparent by the middle of April; in June it passed at the same distance from the [[zenith]] as it did in December; and in September it passed through its most northerly position, the extreme range from north to south, i.e. the angle between the March and September positions, being 40".
===Aberration vs nutation===
This motion was evidently not due to parallax, for the reasons given in the discussion of Figure 2, and neither was it due to observational errors. Bradley and Molyneux discussed several hypotheses in the hope of finding the solution. The idea that immediately suggested itself was that the star's declination varied because of short-term changes in the orientation of the Earth's axis relative to the celestial sphere – a phenomenon known as [[nutation]]. Because this is a change to the observer's frame of reference (i.e. the Earth itself), it would therefore affect all stars equally. For instance, a change in the declination of γ Draconis would be mirrored by an equal and opposite change to the declination of a star 180 degrees opposite in right ascension.
Observations of such a star were made difficult by the limited field of view of Bradley and Molyneux's telescope, and the lack of suitable stars of sufficient brightness. One such star, however, with a right ascension nearly equal to that of γ Draconis, but in the opposite sense, was selected and kept under observation. This star was seen to possess an apparent motion similar to that which would be a consequence of the nutation of the Earth's axis; but since its declination varied only one half as much as in the case of γ Draconis, it was obvious that nutation did not supply the requisite solution. Whether the motion was due to an irregular distribution of the [[Earth's atmosphere]], thus involving abnormal variations in the refractive index, was also investigated; here, again, negative results were obtained.
On [[August 19]], [[1727]], Bradley then embarked upon a further series of observations using a telescope of his own erected at the Rectory, [[Wanstead]]. This instrument had the advantage of a larger field of view and he was able to obtain precise positions of a large number of stars that transited close to the zenith over the course of about two years. This established the existence of the phenomenon of aberration beyond all doubt, and also allowed Bradley to formulate a set of rules that would allow the calculation of the effect on any given star at a specified date. However, he was no closer to finding an explanation of why aberration occurred.
===Development of the theory of aberration===
Bradley eventually developed the explanation of aberration in about September [[1728]] and his theory was presented to the [[Royal Society]] a year later. One well-known story (quoted in ''Berry'', p 261) was that he saw the change of direction of a wind vane on a boat on the [[Thames]], caused not by an alteration of the wind itself, but by a change of course of the boat relative to the wind direction. However, there is no record of this incident in Bradley's own account of the discovery, and it may therefore be [[apocrypha]]l.
The discovery and elucidation of aberration is now regarded as a classic case of the application of [[scientific method]], in which observations are made to test a theory, but unexpected results are sometimes obtained that in turn lead to new discoveries. It is also worth noting that part of the original motivation of the search for stellar parallax was to test the Copernican theory that the Earth revolves around the Sun, but of course the existence of aberration also establishes the truth of that theory.
In a final twist, Bradley later went on to discover the existence of the nutation of the Earth's axis – the effect that he had originally considered to be the cause of aberration.
== References ==
<references/>
*P. Kenneth Seidelmann (Ed.), ''Explanatory Supplement to the Astronomical Almanac'' (University Science Books, [[1992]]), 127-135, 700.
*[[Simon Newcomb]], ''A Compendium of Spherical Astronomy'' (Macmillan, [[1906]] – republished by [[Dover Publications|Dover]], [[1960]]), 160-172.
*Arthur Berry, ''A Short History of Astronomy'' (John Murray, [[1898]] – republished by Dover, [[1961]]), 258-265.
*S. Rigaud, ''Memoirs of Bradley'' ([[1832]])
*Charles Hutton, ''Mathematical and Philosophical Dictionary'' ([[1795]]).
*H. H. Turner, ''Astronomical Discovery'' ([[1904]]).
== See also ==
{{commons|Aberration of light}}
{{Wikisource1911Enc|Abberation}}
* [[Aberration in optical systems|Aberration]]
* [[Nutation]]
* [[Proper motion]]
* [[James Bradley|Bradley, James]]
* [[Augustin-Jean Fresnel|Fresnel, Augustin-Jean]]
* [[List of astronomical topics]]
* [[George Gabriel Stokes|Stokes, George Gabriel]]
* [[Timeline of electromagnetism and classical optics]]
{{1911}}
==External links==
* [http://www.mathpages.com/rr/s2-05/2-05.htm Stellar Aberration] at MathPages
[[Category:Electromagnetic radiation]]
[[Category:Astrometry]]
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