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Love number

From Wikipedia, the free encyclopedia

The Love numbers (h, k, and l) are dimensionless parameters that measure the rigidity of a planetary body or other gravitating object, and the susceptibility of its shape to change in response to an external tidal potential.

In 1909, Augustus Edward Hough Love introduced the values h and k which characterize the overall elastic response of the Earth to the tides—Earth tides or body tides.[1] Later, in 1912, Toshi Shida added a third Love number, l, which was needed to obtain a complete overall description of the solid Earth's response to the tides.[2]

Definitions

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The Love number h is defined as the ratio of the body tide to the height of the static equilibrium tide;[3] also defined as the vertical (radial) displacement or variation of the planet's elastic properties. In terms of the tide generating potential , the displacement is where is latitude, is east longitude and is acceleration due to gravity.[4] For a hypothetical solid Earth . For a liquid Earth, one would expect . However, the deformation of the sphere causes the potential field to change, and thereby deform the sphere even more. The theoretical maximum is . For the real Earth, lies between 0 and 1.

The Love number k is defined as the cubical dilation or the ratio of the additional potential (self-reactive force) produced by the deformation of the deforming potential. It can be represented as , where for a rigid body.[4]

The Love number l represents the ratio of the horizontal (transverse) displacement of an element of mass of the planet's crust to that of the corresponding static ocean tide.[3] In potential notation the transverse displacement is , where is the horizontal gradient operator. As with h and k, for a rigid body.[4]

Values

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According to Cartwright, "An elastic solid spheroid will yield to an external tide potential of spherical harmonic degree 2 by a surface tide and the self-attraction of this tide will increase the external potential by ."[5] The magnitudes of the Love numbers depend on the rigidity and mass distribution of the spheroid. Love numbers , , and can also be calculated for higher orders of spherical harmonics.

For elastic Earth the Love numbers lie in the range: , and .[3]

For Earth's tides one can calculate the tilt factor as and the gravimetric factor as , where subscript two is assumed.[5]

Neutron stars are thought to have high rigidity in the crust, and thus a low Love number: ;[6][7] isolated, nonrotating black holes in vacuum have vanishing Love numbers for all multipoles .[8][9][10] Measuring the Love numbers of compact objects in binary mergers is a key goal of gravitational-wave astronomy.

References

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  1. ^ Love Augustus Edward Hough. The yielding of the earth to disturbing forces 82 Proc. R. Soc. Lond. A 1909 http://doi.org/10.1098/rspa.1909.0008
  2. ^ TOSHI SHIDA, On the Body Tides of the Earth, A Proposal for the International Geodetic Association, Proceedings of the Tokyo Mathematico-Physical Society. 2nd Series, 1911-1912, Volume 6, Issue 16, Pages 242-258, ISSN 2185-2693, doi:10.11429/ptmps1907.6.16_242.
  3. ^ a b c "Tidal Deformation of the Solid Earth: A Finite Difference Discretization", S.K.Poulsen; Niels Bohr Institute, University of Copenhagen; p 24; [1] Archived 2016-10-11 at the Wayback Machine
  4. ^ a b c Earth Tides; D.C.Agnew, University of California; 2007; 174
  5. ^ a b Tides: A Scientific History; David E. Cartwright; Cambridge University Press, 1999, ISBN 0-521-62145-3; pp 140–141,224
  6. ^ Yazadjiev, Stoytcho S.; Doneva, Daniela D.; Kokkotas, Kostas D. (October 2018). "Tidal Love numbers of neutron stars in f(R) gravity". The European Physical Journal C. 78 (10): 818. arXiv:1803.09534. Bibcode:2018EPJC...78..818Y. doi:10.1140/epjc/s10052-018-6285-z. PMC 6244867. PMID 30524193.
  7. ^ Hinderer, Tanja; Lackey, Benjamin D.; Lang, Ryan N.; Read, Jocelyn S. (23 June 2010). "Tidal deformability of neutron stars with realistic equations of state and their gravitational wave signatures in binary inspiral". Physical Review D. 81 (12): 123016. arXiv:0911.3535. Bibcode:2010PhRvD..81l3016H. doi:10.1103/PhysRevD.81.123016. hdl:1721.1/64461. S2CID 14819350.
  8. ^ Damour, Thibault; Nagar, Alessandro (2009-10-23). "Relativistic tidal properties of neutron stars". Physical Review D. 80 (8): 084035. arXiv:0906.0096. Bibcode:2009PhRvD..80h4035D. doi:10.1103/PhysRevD.80.084035. ISSN 1550-7998.
  9. ^ Binnington, Taylor; Poisson, Eric (2009-10-14). "Relativistic theory of tidal Love numbers". Physical Review D. 80 (8): 084018. arXiv:0906.1366. Bibcode:2009PhRvD..80h4018B. doi:10.1103/PhysRevD.80.084018.
  10. ^ Chia, Horng Sheng (2021-07-06). "Tidal deformation and dissipation of rotating black holes". Physical Review D. 104 (2): 024013. arXiv:2010.07300. Bibcode:2021PhRvD.104b4013C. doi:10.1103/PhysRevD.104.024013. ISSN 2470-0010.