Rossiter–McLaughlin effect

Animation of the Rossiter-Mclaughlin (RM) effect

The Rossiter–McLaughlin effect is a spectroscopic phenomenon observed when an object moves across the face of a rotating star. The star is seen to undergo a redshift anomaly caused by the obscuration of different parts of its disk.

Description

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The Rossiter–McLaughlin effect is a spectroscopic phenomenon observed when either an eclipsing binary's secondary star or an extrasolar planet is seen to transit across the face of the primary or parent star.

As the main star rotates on its axis, one quadrant of its photosphere will be seen to be coming towards the viewer, and the other visible quadrant to be moving away. These motions produce blueshifts and redshifts, respectively, in the star's spectrum, usually observed as a broadening of the spectral lines. When the secondary star or planet transits the primary, it blocks part of the latter's disc, preventing some of the shifted light from reaching the observer. That causes the observed mean redshift of the primary star as a whole to vary from its normal value. As the transiting object moves across to the other side of the star's disc, the redshift anomaly will switch from being negative to being positive, or vice versa.

The viewer is situated at the bottom. Light from the anticlockwise-rotating star is blue-shifted on the approaching side, and red-shifted on the receding side. As the planet passes in front of the star it sequentially blocks blue- and red-shifted light, causing the star's apparent radial velocity to change, but it does not in fact change.

Retrograde motion of "hot Jupiters"

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This effect has been used to show that as many as 25% of hot Jupiters are orbiting in a retrograde direction with respect to their parent stars, strongly suggesting that dynamical interactions rather than planetary migration produce these objects if no additional processes are involved.[1]

History

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J. R. Holt in 1893 proposed a method to measure the stellar rotation of stars by using radial velocity measurements. He predicted that when one star of an eclipsing binary eclipsed the other, it would first cover the advancing blueshifted half and then the receding redshifted half. That motion would create a redshift of the eclipsed star's spectrum followed by a blueshift, which would thus appear as a change in the measured radial velocity in addition to that caused by the orbital motion of the eclipsed star.[2][3]

The effect is named after Richard Alfred Rossiter and Dean Benjamin McLaughlin.[4]

Further reading

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  • Ohta, Y.; Taruya, A. & Suto, Y. (2005). "The Rossiter–McLaughlin Effect and Analytic Radial Velocity Curves for Transiting Extrasolar Planetary Systems". The Astrophysical Journal. 622 (1): 1118–1135. arXiv:astro-ph/0410499. Bibcode:2005ApJ...622.1118O. doi:10.1086/428344. S2CID 10420706.
  • Anderson, D.; et al. (2010). "WASP-17b: An Ultra-Low Density Planet In A Probable Retrograde Orbit". The Astrophysical Journal. 709 (1): 159–167. arXiv:0908.1553. Bibcode:2010ApJ...709..159A. doi:10.1088/0004-637X/709/1/159. S2CID 53628741.
  • Winn, J. (2006). "Exoplanets and the Rossiter-McLaughlin Effect". In C. Afonso; D. Weldrake; T. Henning (eds.). Transiting Extrasolar Planets Workshop. ASP Conference Proceedings. Vol. 366. p. 170. arXiv:astro-ph/0612744. Bibcode:2007ASPC..366..170W.

References

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  1. ^ Triaud, A. H. M. J.; et al. (2010). "Spin-orbit angle measurements for six southern transiting planets: New insights into the dynamical origins of hot Jupiters". Astronomy & Astrophysics. 524: A25. arXiv:1008.2353. Bibcode:2010A&A...524A..25T. doi:10.1051/0004-6361/201014525. S2CID 59320239.
  2. ^ Holt, J. R. (August 1893). "Spectroscopic Determination of Stellar Rotation". Astronomy and Astro-Physics. 12 (7): 646. Bibcode:1893AstAp..12..646H.
  3. ^ Triaud, A. H. M. J.; et al. (2013). "The EBLM project I. Physical and orbital parameters, including spin-orbit angles, of two low-mass eclipsing binaries on opposite sides of the brown dwarf limit". Astronomy and Astrophysics. 549 A18. arXiv:1208.4940. Bibcode:2013A&A...549A..18T. doi:10.1051/0004-6361/201219643.
  4. ^ Boué, G.; et al. (2013). "New analytical expressions of the Rossiter-McLaughlin effect adapted to different observation techniques". Astronomy & Astrophysics. 550 A53. arXiv:1211.3310. Bibcode:2013A&A...550A..53B. doi:10.1051/0004-6361/201220146.
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