1 stable release
Uses old Rust 2015
2.0.0  May 22, 2016 

1.0.7 

1.0.6 

0.1.0 

0.0.9 

#214 in Algorithms
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astrorust
Contents
About
astrorust
is a library of astronomical algorithms for the Rust programming language.
Implemented algorithms include
 planetary and solar positioning by the complete set of elements of Bretagnon and Francou's VSP087 theory
 lunar positioning by the principle elements of Chapront's ELP2000/82 theory
 satellite positioning for Saturn and Jupiter
 finding Julian dates, sidereal time, dynamical time, equinoxes, rising and setting times, times of lunar phases
 coordinate transformations
 corrections for precession, nutation, parallax, aberration, atmospheric refraction
 calculation of the physical ephemeris for Mars, Jupiter, and the rings of Saturn
 finding position angles, illuminated fractions, visual magnitudes
 and much more.
Usage

Add the dependency
astro
in yourCargo.toml
[dependencies] astro = "1.0.7"

Include the crate
astro
in your codeextern crate astro; use astro::*;

Specify your time of interest using the Julian day
// for example, the time of the Apollo 11 moon landing let day_of_month = time::DayOfMonth{day : 20, hr : 20, min : 18, sec : 4.0, time_zone: 0.0}; let date = time::Date{year : 1969, month : 7, // July decimal_day: time::decimal_day(&day_of_month), cal_type : time::CalType::Gregorian}; let julian_day = time::julian_day(&date); // for higher accuracy in specifying the time of interest, // find the Julian Ephemeris day; this slightly differs from // the Julian day by ΔT, which is usually a few seconds. you // can get a reported value of it from the Astronomical // Almanac, or calculate it using the builtin function let delta_t = time::approx_delta_t(date.year, date.month); // a good one, actually let julian_ephm_day = time::julian_emph_day(julian_day, delta_t);

Find the position of the Sun and the Moon with respect to the Earth
// geocentric ecliptic point and radius vector of the Sun let (sun_ecl_point, rad_vec_sun) = sun::geocen_ecl_pos(julian_day); // sun_ecl_point.long  ecliptic longitude (radians) // sun_ecl_point.lat  ecliptic latitude (radians) // rad_vec_sun  distance between the Sun and the Earth (AU) // and similarly for the Moon let (moon_ecl_point, rad_vec_moon) = lunar::geocen_ecl_pos(julian_day);

Find the position of a planet with respect to the Sun
// the heliocentric point and radius vector of a planet, like Jupiter let (jup_long, jup_lat, rad_vec) = planet::heliocen_pos(&planet::Planet::Jupiter, julian_day); // or neptune let (nep_long, nep_lat, rad_vec) = planet::heliocen_pos(&planet::Planet::Neptune, julian_day); // positioning for all the eight planets (and (the dwarf planet) Pluto) is supported let (plut_long, plut_lat, rad_vec) = pluto::heliocen_pos(julian_day);

Find the geodesic distance between two locations on Earth
// geodesic distance between the Observatoire de Paris and // the US Naval Observatory at Washington DC let paris = coords::GeographPoint{long: angle::deg_frm_dms(2, 20, 14.0).to_radians(), lat : angle::deg_frm_dms(48, 50, 11.0).to_radians()}; let washington = coords::GeographPoint{long: angle::deg_frm_dms(77, 3, 56.0).to_radians(), lat : angle::deg_frm_dms(38, 55, 17.0).to_radians()}; // angle::deg_frm_dms() converts degrees expressed in degrees, // minutes and seconds into a fractional degree let distance = planet::earth::geodesic_dist(&paris, &washington); // in meters

Convert equatorial coordinates to ecliptic coordinates
// equatorial coordinates of the star Pollux let right_ascension = 116.328942_f64.to_radians(); let declination = 28.026183_f64.to_radians(); // mean obliquity of the ecliptic let oblq_eclip = 23.4392911_f64.to_radians(); // you can also get oblq_eclip from ecliptic::mn_oblq_IAU(julian_day) // for the Julian day on which the coordinates of the star // were observed // also make sure to type #[macro_use] before including the crate // to use macros // now, convert equatorial coordinates to ecliptic coordinates let (ecl_long, ecl_lat) = ecl_frm_eq!(right_ascension, declination, oblq_eclip);

Convert equatorial coordinates to galactic coordinates
// equatorial coordinates of the Nova Serpentis 1978 let right_ascension = angle::deg_frm_hms(17, 48, 59.74).to_radians(); let declination = angle::deg_frm_dms(14, 43, 8.2).to_radians(); // convert to galactic coordinates let (gal_long, gal_lat) = gal_frm_eq!(right_ascension, declination);

Correct for nutation in different coordinate systems
// nutation in ecliptic longitude and obliquity of the ecliptic let (nut_in_long, nut_in_oblq) = nutation::nutation(julian_day); // nutation in equatorial coordinates let (nut_in_asc, nut_in_dec) = nutation::nutation_in_eq_coords(julian_day);
Contributing
Anyone interested to contribute in any way possible is encouraged to do so. Not all the algorithms in Meeus's book have been implemented yet. Documentation and tests need to be written for them as well. Refactored code and minor optimizations for the existing code are also welcome.
The end goal (of this project) is to build a modern, welltested, welldocumented library of algorithms for future use in astronomy. And Rust is very much the right choice for building that.
A fun suggestion is the addition of the recent IAU 2000/2006 precessionnutation model. This method improves upon the existing model implemented here "by taking into account the effect of mantle anelasticity, ocean tides, electromagnetic couplings produced between the fluid outer core and the mantle as well as between the solid inner core and fluid outer core".
References
The main reference used as the source of algorithms is the famous book Astronomical Algorithms by Jean Meeus, whose almost every chapter has been addressed here, with functions that are welldocumented and tests that use example data from the book; in some cases, such as ΔT approximation and planetary heliocentric positioning, more accurate methods have been implemented.
 Most algorithms: Astronomical Algorithms, 2nd edition (Meeus)
 Planetary heliocentric positioning: VSOP87D
 Approximating ΔT: Five Millennium Canon of Solar Eclipses (Espenak and Meeus)
 Some physical constants: World Geodetic System 1984