TY - JOUR

T1 - An iterative method for obtaining a nonlinear solution for the temperature distribution of a rotating spherical body revolving in a circular orbit around a star

AU - Sekiya, M.

AU - Shimoda, A. A.

N1 - Copyright:
Copyright 2013 Elsevier B.V., All rights reserved.

PY - 2013/8

Y1 - 2013/8

N2 - We developed an iterative method for determining the time-dependent three-dimensional temperature distribution in a spherical body with smooth surface that is irradiated by a star. In the method developed in our previous paper (Sekiya et al.; 2012), only the rotational motion is taken into account and the effect due to the revolution around the star is ignored. The present work includes both the effects of the rotation and the revolution. We take into account the cooling due to the surface radiation that is proportional to the fourth power of the temperature; this is the difference in the present work from Vokrouhlický (1999) that employs the linear approximation for the radiative cooling. It is assumed that material parameters such as the thermal conductivity and the thermometric conductivity are constant throughout the spherical body. We obtain a general solution for the temperature distribution inside a body by using the spherical harmonics and the spherical Bessel functions for space and the Fourier series for the time. The term in the boundary condition that represents the heating due to the star is also expanded into the spherical harmonics and the Fourier series. The coefficients of the general solution are fitted to satisfy the surface boundary condition by using an iterative method. We obtained solutions that satisfy the nonlinear boundary condition within 0.1% accuracy. The temperature distribution determined according to the iterative method is different from that according to the linear approximation; both the maximum and minimum temperatures at a given time after the summer solstice for an iterative solution are lower than those for a linear solution. The maximum difference between rate of change of the semimajor axis due to the Yarkovsky effect according to the iterative solution and that according to the linear solution is about 20%. Therefore, current understanding of the Yarkovsky effect based on linear solutions is fairly good.

AB - We developed an iterative method for determining the time-dependent three-dimensional temperature distribution in a spherical body with smooth surface that is irradiated by a star. In the method developed in our previous paper (Sekiya et al.; 2012), only the rotational motion is taken into account and the effect due to the revolution around the star is ignored. The present work includes both the effects of the rotation and the revolution. We take into account the cooling due to the surface radiation that is proportional to the fourth power of the temperature; this is the difference in the present work from Vokrouhlický (1999) that employs the linear approximation for the radiative cooling. It is assumed that material parameters such as the thermal conductivity and the thermometric conductivity are constant throughout the spherical body. We obtain a general solution for the temperature distribution inside a body by using the spherical harmonics and the spherical Bessel functions for space and the Fourier series for the time. The term in the boundary condition that represents the heating due to the star is also expanded into the spherical harmonics and the Fourier series. The coefficients of the general solution are fitted to satisfy the surface boundary condition by using an iterative method. We obtained solutions that satisfy the nonlinear boundary condition within 0.1% accuracy. The temperature distribution determined according to the iterative method is different from that according to the linear approximation; both the maximum and minimum temperatures at a given time after the summer solstice for an iterative solution are lower than those for a linear solution. The maximum difference between rate of change of the semimajor axis due to the Yarkovsky effect according to the iterative solution and that according to the linear solution is about 20%. Therefore, current understanding of the Yarkovsky effect based on linear solutions is fairly good.

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U2 - 10.1016/j.pss.2013.05.015

DO - 10.1016/j.pss.2013.05.015

M3 - Article

AN - SCOPUS:84880262381

SN - 0032-0633

VL - 84

SP - 112

EP - 121

JO - Planetary and Space Science

JF - Planetary and Space Science

ER -