Fourier Analysis of the Light Curves of Eclipsing Variables, II
Abstract
The aim of the present paper will be to extend the Fourier methods of analysis of the light curves of eclipsing binaries, outlined in our previous communication (Kopal, 1975) in connection with systems whose components would appear as uniformly bright discs, to systems whose components exhibit discs characterized by an arbitrary radially-symmetrical distribution of brightness —i.e., an arbitrary ‘law of darkening’ towards the limb — be it linear or nonlinear. In Section 2 which follows a few brief introductory remarks, fundamental equations will be set up which govern the light changes arising from the mutual eclipses of limb-darkened stars — be such eclipses total, partial or annular; and Section 3 will contain a closed algebraic solution for the elements of the occulation eclipses terminating in total phase. Such a solution proves to be no more complicated than it turned out to be for uniformly bright discs in our previous paper; and calls for no special functions for the purpose — as will be put in proper perspective in the concluding Section 4. The cases of transit eclipses terminating in an annular phase, of partial eclipses of occulation or transit type, will be similarly dealt with by Fourier methods in the next paper of the present series.
- Publication:
-
Astrophysics and Space Science
- Pub Date:
- June 1975
- DOI:
- 10.1007/BF00644830
- Bibcode:
- 1975Ap&SS..35..159K
- Keywords:
-
- Eclipsing Binary Stars;
- Fourier Analysis;
- Light Curve;
- Stellar Luminosity;
- Variable Stars;
- Limb Darkening;
- Luminous Intensity;
- Radial Distribution;
- Stellar Occultation;
- Astrophysics