Barycentric_Julian_Date

Barycentric Julian Date

Julian Date corrected with respect to the barycentre of the Solar System.

The Barycentric Julian Date (BJD) is the Julian Date (JD) corrected for differences in the Earth's position with respect to the barycentre of the Solar System. Due to the finite speed of light, the time an astronomical event is observed depends on the changing position of the observer in the Solar System. Before multiple observations can be combined, they must be reduced to a common, fixed, reference location. This correction also depends on the direction to the object or event being timed.

In 1991, the BJD replaced the Heliocentric Julian Date (HJD), which reduced times to the centre of the Sun, which itself orbits the barycentre. The difference between HJD and BJD is up to ±4 s.

Calculation

Exact expression

Neglecting effects of special and general relativity, the correction of Terrestrial Time (TT) is

BJD_{TT}=JD_{TT}+{\frac {|{\vec {r}}+d\,{\hat {n}}|-d}{c}}

where ${\vec {r}}$ is the vector from the barycentre to the observer, ${\hat {n}}$ is the unit vector from the observer to the object or event, $d$ is the distance from the observer to the observed object or event, and $c$ is the speed of light.

This expression should be used for objects within the Solar System.

Expression for infinite distance

In the limit of infinite distance to the object, the exact expression becomes

BJD_{TT}=JD_{TT}+{\frac {{\vec {r}}\cdot {\hat {n}}}{c}}

This expression should be used for objects beyond the Solar System. The error is at the level of 100 s for objects in the main asteroid belt, 5 s for Edgeworth-Kuiper Belt objects. At the distance of Proxima Centauri the accuracy is 1 ms.

Approximation for large distance

Due to the limited precision with which floating point numbers are stored in computers, the exact expression is in practice not accurate for large distances. The approximation

BJD_{TT}=JD_{TT}+{\frac {{\vec {r}}\cdot {\hat {n}}}{c}}+{\frac {{\vec {r}}\cdot {\vec {r}}-({\vec {r}}\cdot {\hat {n}})^{2}}{2\,c\,d}}

is accurate for large distances. It should be used if the object is beyond the Solar System and if also millisecond accuracy is required.

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Barycentric_Julian_Date

Barycentric Julian Date

Magnitude of the correction

Time Standard

Calculation

Exact expression

Expression for infinite distance

Approximation for large distance

See also

References

External links

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