In orbital mechanics, the universal variable formulation is a method used to solve the two-body Kepler problem. It is a generalized form of Kepler's Equation, extending it to apply not only to elliptic orbits, but also parabolic and hyperbolic orbits common for spacecraft departing from a planetary orbit. It is also applicable to ejection of small bodies in Solar System from the vicinity of massive planets, during which processes the approximating two-body orbits can have widely varying eccentricities, almost always e ≥ 1 .
Introduction
editA common problem in orbital mechanics is the following: Given a body in an orbit and a fixed original time find the position of the body at some later time For elliptical orbits with a reasonably small eccentricity, solving Kepler's Equation by methods like Newton's method gives excellent results. However, as the orbit approaches an escape trajectory, it becomes more and more eccentric, convergence of numerical iteration may become unusably sluggish, or fail to converge at all for e ≥ 1 .[1][2]
Note that the conventional form of Kepler's equation cannot be applied to parabolic and hyperbolic orbits without special adaptions, to accommodate imaginary numbers, since its ordinary form is specifically tailored to sines and cosines; escape trajectories instead use sinh and cosh (hyperbolic functions).
Derivation
editAlthough equations similar to Kepler's equation can be derived for parabolic and hyperbolic orbits, it is more convenient to introduce a new independent variable to take the place of the eccentric anomaly and having a single equation that can be solved regardless of the eccentricity of the orbit. The new variable is defined by the following differential equation:
- where is the time-dependent scalar distance to the center of attraction.
(In all of the following formulas, carefully note the distinction between scalars in italics, and vectors in upright bold.)
We can regularize the fundamental equation
- where is the system gravitational scaling constant,
by applying the change of variable from time to which yields[2]
where is some t.b.d. constant vector and : is the orbital energy, defined by
The equation is the same as the equation for the harmonic oscillator, a well-known equation in both physics and mathematics, however, the unknown constant vector is somewhat inconvenient. Taking the derivative again, we eliminate the constant vector at the price of getting a third-degree differential equation:
The family of solutions to this differential equation[2] are for convenience written symbolically in terms of the three functions and where the functions called Stumpff functions, which are truncated generalizations of sine and cosine series. The change-of-variable equation gives the scalar integral equation
After extensive algebra and back-substitutions, its solution results in[2]: Eq. 6.9.26
which is the universal variable formulation of Kepler's equation.
There is no closed analytic solution, but this universal variable form of Kepler's equation can be solved numerically for using a root-finding algorithm such as Newton's method or Laguerre's method for a given time The value of so-obtained is then used in turn to compute the and functions and the and functions needed to find the current position and velocity:
The values of the and functions determine the position of the body at the time :
In addition the velocity of the body at time can be found using and as follows:
- where and are respectively the position and velocity vectors at time and and
- are the position and velocity at arbitrary initial time
References
edit- ^ Stiefel, Eduard L.; Scheifele, Gerhard (1971). Linear and Regular Celestial Mechanics: Perturbed two-body motion, numerical methods, canonical theory. Springer-Verlag.
- ^ a b c d Danby, J.M.A. (1988). Fundamentals of Celestial Mechanics (2nd ed.). Willmann-Bell. ISBN 0943396204.