Creating a Chebyshev ephemeris of the sun
|
10-17-2022, 07:46 PM
Post: #1
|
|||
|
|||
Creating a Chebyshev ephemeris of the sun
This HP Prime program can be used to create a Chebyshev representation of the geocentric position vector of the sun. The first part of the software demonstrates how to create the coefficients and the second part illustrates how to evaluate the coefficients and produce a solar position vector.
The "fit" or degree of the representation is defined in the software with the following // define order of "fit" or approximation EXPORT nfit := 18; For the sun nfit = 18-21 is usually adequate. The initial date and length of the approximation is defined in the software with // define initial utc calendar date of the Chebyshev ephemeris month := 8; day := 12; year := 2023; For the motion of the sun, a fit interval of 90-120 days is recommended. // create 90 day Chebyshev ephemeris deltat := 90.0; Once the coefficients have been created, they can be evaluated for any time within the fit interval with the following source code // select a valid tdt julian day within the span // of the chebyshev ephemeris delta_days := 40.56788; jdtdt := jdtdt1 + delta_days; x := (jdtdt - 2451545.0) / 36525.0; // evaluate Chebyshev ephemeris at user-defined x rsun_cheby(1) := cheby_eval(ta, tb, nfit, rx_poly, x); rsun_cheby(2) := cheby_eval(ta, tb, nfit, ry_poly, x); rsun_cheby(3) := cheby_eval(ta, tb, nfit, rz_poly, x); The coefficients need only be created once. They can then be used to compute different positions of the sun repeatedly. This is useful because the Chebyshev approach is faster than evaluating an analytic algorithm for the sun's position. The final part of the software displays the differences between the Chebyshev and analytic ephemeris for a single time within the approximation interval. |
|||
« Next Oldest | Next Newest »
|
User(s) browsing this thread: 1 Guest(s)