The Concentric Maclaurin Spheroid method with tides and a rotational enhancement of Saturn's tidal response
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[1] T. Guillot,et al. New constraints on Saturn’s interior from Cassini astrometric data , 2015, 1510.05870.
[2] J. Wisdom,et al. Differential rotation in Jupiter: A comparison of methods , 2016 .
[3] B. Militzer,et al. A PRELIMINARY JUPITER MODEL , 2016, 1602.05143.
[4] D. Stevenson,et al. Gravity and zonal flows of giant planets: From the Euler equation to the thermal wind equation , 2015, 1508.02764.
[5] K. V. Kholshevnikov,et al. The flattenings of the layers of rotating planets and satellites deformed by a tidal potential , 2015, 1503.08051.
[6] J. Tassoul. Theory of Rotating Stars. (PSA-1) , 2015 .
[7] G. Schubert,et al. On the convergence of the theory of figures , 2014 .
[8] G. Schubert,et al. Gravitational signature of rotationally distorted Jupiter caused by deep zonal winds , 2013 .
[9] R. Redmer,et al. Saturn layered structure and homogeneous evolution models with different EOSs , 2013, 1304.4707.
[10] W. Hubbard. CONCENTRIC MACLAURIN SPHEROID MODELS OF ROTATING LIQUID PLANETS , 2013, 1305.0803.
[11] A. Correia,et al. ON THE EQUILIBRIUM FIGURE OF CLOSE-IN PLANETS AND SATELLITES , 2013, 1304.1425.
[12] Y. Kaspi. Inferring the depth of the zonal jets on Jupiter and Saturn from odd gravity harmonics , 2013 .
[13] Tristan Guillot,et al. INTERIOR MODELS OF SATURN: INCLUDING THE UNCERTAINTIES IN SHAPE AND ROTATION , 2013, 1302.6690.
[14] W. Hubbard. HIGH-PRECISION MACLAURIN-BASED MODELS OF ROTATING LIQUID PLANETS , 2012 .
[15] D. Tholen,et al. Report of the IAU Working Group on Cartographic Coordinates and Rotational Elements: 2009 , 2011 .
[16] D. Stevenson,et al. On the degeneracy of the tidal Love number k2 in multi-layer planetary models: application to Saturn and GJ 436b , 2011, 1101.0997.
[17] T. Gudkova,et al. Models, figures and gravitational moments of Jupiter's satellite Io: Effects of the second order approximation , 2010 .
[18] W. Hubbard,et al. Gravitational signature of Jupiter's internal dynamics , 2009 .
[19] D. Ceperley,et al. Phase separation in hydrogen–helium mixtures at Mbar pressures , 2009, Proceedings of the National Academy of Sciences.
[20] D. W. Parcher,et al. The Gravity Field of the Saturnian System from Satellite Observations and Spacecraft Tracking Data , 2006 .
[21] C. Russell,et al. A regular period for Saturn's magnetic field that may track its internal rotation , 2006, Nature.
[22] V. Zharkov. A theory of the equilibrium figure and gravitational field of the Galilean satellite Io: The second approximation , 2004 .
[23] T. Gudkova,et al. Models of Jupiter and Saturn after Galileo mission , 1999 .
[24] S. Gavrilov,et al. Dynamical theory of the tides on the giant planets , 1984 .
[25] W. Hubbard. Effects of differential rotation on the gravitational figures of Jupiter and Saturn , 1982 .
[26] M. L. Kaiser,et al. Voyager measurement of the rotation period of Saturn's magnetic field , 1981 .
[27] V. Zharkov,et al. The physics of planetary interiors , 1985 .
[28] R. L. Duncombe,et al. Report of the IAU Working Group on Cartographic Coordinates and Rotational Elements of the Planets and Satellites , 1980 .
[29] J. Tassoul,et al. Theory of rotating stars , 1978 .
[30] S. Gavrilov,et al. Love numbers of the giant planets , 1977 .
[31] W. Hubbard. Gravitational field of a rotating planet with a polytropic index of unity , 1974 .
[32] G. Cole. The Physics of Planetary Interiors , 1973 .
[33] David Engel. The Rotation Of The Earth A Geophysical Discussion , 1961, Geological Magazine.
[34] J. Jeans. Problems of Cosmology and Stellar Dynamics , 1920 .