С.А. Заборский, Е.В. Кирилюк

12

Инженерный журнал: наука и инновации

# 5·2017

Optimal bielliptic transition between coplanar

elliptical orbits

© S.A. Zaborskiy

1

, E.V. Kiriluk

2

1

S.P. Korolev Rocket аnd Space Public Corporation Energia,

Korolev town, Moscow region, 141070, Russia

2

Bauman Moscow State Technical University, 105055, Russia

An analytic solution of the problem of the bielliptic three-pulse transition between circu-

lar orbits and an analytic solution for the problem of the bielliptic transition between

coaxial elliptic orbits are presented. These solutions were published in a number of

sources. In this article, an attempt is made to generalize the existing results for the case

of the transition between two specified points belonging to boundary disparate elliptic

orbits when the radial values of the transition orbit apogee are specified. An analysis of

the obtained relationship for the size of the total pulse increment of the velocity necessary

for the performing the bielliptic maneuver is given. The limiting case in which the biellip-

tic transition degenerates into a biparabolic transition is considered. The dependences of

the transition orbit parameters and the conditions under which the three-pulse transition

can have advantages over the two-pulse one are established.

Keywords:

optimal maneuver, coplanar transition, interorbital transition, biparabolic ma-

neuver, bi-elliptic maneuver, analytical solution, impulse maneuver

REFERENCES

[1]

Hohmann W.

Die Erreichbrakeit der Himmelskörper

. Oldenbourg, 1925, 88 S.

[2]

Gobetz F.W., Doll J.R.

AIAA Journal

, 1969, vol. 7, no. 5, pp. 801–834.

DOI: 10.2514/3.5231

[3]

Battin R.H.

An Introduction to the Mathematics and Methods of Astrodynamics.

New York, AIAA, 1999, 796 p.

[4]

Lawden D.F.

Optimal Trajectories for Space Navigation.

London, Batterworths,

1963, 123 p.

[5]

Horner J.M.

ARS Journal,

1962, vol. 32, no. 1, pp. 95–96.

[6]

Horner J.M.

AIAA Journal,

1963, vol. 1, no. 7, pp. 1707–1708.

DOI:10.2514/3.1906

[7]

Hoelker R.F., Silber R. The Bi-Elliptical Coplanar Circular Orbits.

Proceeding

of the 4th Symposium on Ballistic Missiles and Space Technology,

New York,

Pergamon, 1961, vol. 3, pp. 164–175.

[8]

Marchal C.

Astronautica Acta,

1965, vol. 11, no. 6, pp. 432–445.

[9]

Zaborsky S.

Journal of Guidance, Control, and Dynamics,

2014, vol. 37, no. 3,

pp. 996–1000. Available at:

http://arc.aiaa.org/doi/pdf/10.2514/1.62072

(accessed September 20, 2016).

[10]

Gill P.E., Murray W.M., Saunders M.A., Wright M.H.

User’s Guide for NPSOL

(version 4.0). A Fortran Package for Nonlinear Programming. Technical Report

SOL 86-2.

Department of Operations Research, Stanford University Publ., 1986,

44 p.

Zaborskiy S.A.,

Cand. Sc. (Eng.), Head of the Launch Vehicle Sector, Department of

Space Ballistics, S.P. Korolev Rocket аnd Space Public Corporation Energia, Assistant