Body tides on an elliptical, rotating, elastic and oceanless earth

Summary. The Earth's deformation caused by the luni-solar tidal force is defined as the 'body tide'. We compute the effects of the Earth's rotation and elliptical stratification on the body tide for a number of modern elastic structural models. Rotation and ellipticity within the mantle are found to affect tidal observations by about 1 per cent. A consequence is an improved estimate for the fluid core resonance in the diurnal tidal band. Agreement between results for the different structural models is very good. As a result, the results computed here can be used to model the tidal effects of a globally averaged, oceanless, rotating, elliptical and elastic earth to an accuracy of at least one part in 300. The combined gravitational force of the Sun and Moon on the Earth consists of a dominant portion which affects the Earth's orbit in space, plus a smaller remainder: the luni-solar tidal force. Although the tidal force exerts no net force on the Earth, it induces a response consisting of deformation (the body tide), changes in the Earth's angular orientation in space (forced precession and nutation), and changes in the Earth's rotation rate. We will describe, below, a simultaneous computation of the Earth's deformational and rotational tidal response which systematically includes the effects of the Earth's rotation and elliptical material stratification. Since the deformation is observed primarily by geodesists and the Earth's rotation by astronomers, it is conventional (and useful) to separate the solution into deformational and rotational components and to consider these terms separately. We will primarily be concerned in this paper with the body tide. The motivation for the present work is the hope that accurate observations of the body tide can improve our knowledge of the Earth's structure and dynamical behaviour. This question is likely to become increasingly important in light of the recent, rapid development of precise geodetic techniques. Seismological and astrometric observations indicate that the

[1]  L. Mansinha,et al.  Oscillation, Nutation and Wobble of an Elliptical Rotating Earth with Liquid Outer Core , 1976 .

[2]  M. Rochester,et al.  Simple core undertones , 1980 .

[3]  T. Jordan,et al.  Earth structure from free oscillations and travel times: Geophys , 1974 .

[4]  Martin L. Smith The Scalar Equations of Infinitesimal Elastic-Gravitational Motion for a Rotating, Slightly Elliptical Earth , 1974 .

[5]  J. Harrison Cavity and topographic effects in tilt and strain measurement , 1976 .

[6]  Robert A. Phinney,et al.  Representation of the Elastic ‐ Gravitational Excitation of a Spherical Earth Model by Generalized Spherical Harmonics , 1973 .

[7]  J. Wahr,et al.  A diurnal resonance in the ocean tide and in the Earth's load response due to the resonant free ‘core nutation’ , 1981 .

[8]  C. Beaumont,et al.  Earthquake Prediction: Modification of the Earth Tide Tilts and Strains by Dilatancy , 1974 .

[9]  W. Farrell Deformation of the Earth by surface loads , 1972 .

[10]  F. Dahlen The Normal Modes of a Rotating, Elliptical Earth , 1968 .

[11]  Don L. Anderson,et al.  An Earth Model based on free oscillations and body waves , 1976 .

[12]  H. Jeffreys,et al.  The Theory of Nutation and the Variation of Latitude , 1957 .

[13]  T. Baker What can earth tide measurements tell us about ocean tides or earth structure , 1978 .

[14]  I. M. Longman A Green's function for determining the deformation of the Earth under surface mass loads: 1. Theory , 1962 .

[15]  R. Warburton,et al.  Detailed gravity‐tide spectrum between one and four cycles per day , 1978 .

[16]  J. Wahr THE TIDAL MOTIONS OF A ROTATING , ELLIPTICAL, ELASTIC AND OCEANLESS EARTH , 1979 .

[17]  F. Dahlen The Normal Modes of a Rotating, Elliptical Earth—II Near-Resonance Multiplet Coupling , 1969 .

[18]  C. Beaumont,et al.  An analysis of tidal strain observations from the United States of America II. The inhomogeneous tide , 1976, Bulletin of the Seismological Society of America.

[19]  M. L. Smith,et al.  The influence of rotation on the free oscillations of the Earth , 1975, Philosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences.

[20]  F. Dahlen Elastic Dislocation Theory for a Self‐Gravitating Elastic Configuration with an Initial Static Stress Field , 1972 .

[21]  H. Jeffreys,et al.  The Theory of Nutation and the Variation of Latitude: The Roche Model Core , 1957 .

[22]  Walter Munk,et al.  The rotation of the earth , 1960 .

[23]  I. M. Longman A Green's function for determining the deformation of the Earth under surface mass loads: 2. Computations and numerical results , 1963 .

[24]  Guy Masters,et al.  Observational constraints on the chemical and thermal structure of the Earth's deep interior , 1979 .

[25]  C. Beaumont,et al.  An analysis of tidal strain observations from the United States of America: I. The laterally homogeneous tide , 1975, Bulletin of the Seismological Society of America.

[26]  J. Wahr,et al.  Effect of the fluid core on changes in the length of day due to long period tides. , 1981 .

[27]  F. Gilbert,et al.  An application of normal mode theory to the retrieval of structural parameters and source mechanisms from seismic spectra , 1975, Philosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences.

[28]  C. Beaumont,et al.  Crustal Structure from Surface Load Tilts, Using a Finite Element Model , 1972 .

[29]  Martin L. Smith Translational inner core oscillations of a rotating, slightly elliptical Earth , 1976 .

[30]  Martin L. Smith Wobble and nutation of the Earth , 1977 .

[31]  J. Wahr A normal mode expansion for the forced response of a rotating earth , 1981 .

[32]  J. Levine Strain-tide spectroscopy , 1978 .

[33]  P. Melchior Precession-nutations and tidal potential , 1971 .

[34]  S. Sakai,et al.  Dissipative Core-Mantle Coupling and Nutational Motion of the Earth , 1977 .

[35]  J. Zschau Tidal Sea Load Tilt of the Crust, and its Application to the Study of Crustal and Upper Mantle Structure* , 1976 .

[36]  R. Sailor,et al.  Measurements and interpretation of normal mode attenuation , 1978 .

[37]  John M. Wahr,et al.  The forced nutations of an elliptical, rotating, elastic and oceanless earth , 1981 .

[38]  Adam M. Dziewonski,et al.  Parametrically simple earth models consistent with geophysical data , 1975 .

[39]  C. Beaumont,et al.  The Effect of Ocean Tide Loading on Tides of the Solid Earth Observed with the Superconducting Gravimeter , 1975 .

[40]  D. E. Cartwright,et al.  Corrected Tables of Tidal Harmonics , 1973 .

[41]  P. Bender,et al.  Nutation and the Earth’s Rotation , 1980 .

[42]  T. Sasao,et al.  A Simple Theory on the Dynamical Effects of a Stratified Fluid Core upon Nutational Motion of the Earth , 1980 .