Optimization of low-thrust interplanetary trajectories using collocation and nonlinear programming

The method of collocation with nonlinear programming is applied to the determination of minimum-time, low-thrust interplanetary transfer trajectories. Since the vehicle motor operates continuously, the minimum-time trajectories are also propellant minimizing. The numerical solution method requires that the transfer be divided into three phases: escape from the departure planet, heliocentric flight, and arrival at the destination planet. Two-body gravitational models are used in each phase and the transformation from planetocentric coordinates to heliocentric coordinates and vice-versa is incorporated as a set of nonlinear constraints on the problem variables. No a priori assumptions on the optimal control time history are required. An Earth-to-Mars transfer with a very low thrust acceleration of 0.0001 g is used as an example.

[1]  W. G. Melbourne,et al.  Optimum earth-to-mars roundtrip trajectories utilizing a low-thrust power-limited propulsion system. , 1963 .

[2]  E. Dickmanns,et al.  Approximate Solution of Optimal Control Problems Using Third Order Hermite Polynomial Functions , 1974 .

[3]  Bion L. Pierson,et al.  Three-stage approach to optimal low-thrust Earth-moon trajectories , 1994 .

[4]  F. Johnson,et al.  Approximate finite-thrust trajectory optimization. , 1969 .

[5]  Bruce A. Conway,et al.  Optimization of very-low-thrust, many-revolution spacecraft trajectories , 1994 .

[6]  M. Handelsman,et al.  Primer Vector on Fixed-Time Impulsive Trajectories , 1967 .

[7]  P. Enright Optimal finite-thrust space craft trajectories using direct transcription and nonlinear programming , 1991 .

[8]  Arthur E. Bryson,et al.  Applied Optimal Control , 1969 .

[9]  D. J. Jezewski,et al.  An efficient method for calculating optimal free-space n-impulse trajectories. , 1968 .

[10]  W. G. Melbourne,et al.  PAYLOAD OPTIMIZATION FOR POWER-LIMITED VEHICLES , 1962 .

[11]  P. Gill,et al.  Fortran package for nonlinear programming. User's Guide for NPSOL (Version 4. 0) , 1986 .

[12]  Bruce A. Conway,et al.  Optimal finite-thrust spacecraft trajectories using collocation and nonlinear programming , 1991 .

[13]  A. L. Herman,et al.  Direct optimization using collocation based on high-order Gauss-Lobatto quadrature rules , 1996 .

[14]  L. Shampine,et al.  A collocation method for boundary value problems , 1972 .

[15]  A. L. Herman,et al.  Direct solutions of optimal orbit transfers using collocation based on Jacobi polynomials , 1994 .

[16]  Derek F Lawden,et al.  Optimal trajectories for space navigation , 1964 .

[17]  W. G. Melbourne,et al.  OPTIMUM INTERPLANETARY RENDEZVOUS WITH POWER-LIMITED VEHICLES , 1963 .

[18]  Bruce A. Conway,et al.  Discrete approximations to optimal trajectories using direct transcription and nonlinear programming , 1992 .

[19]  C. Hargraves,et al.  DIRECT TRAJECTORY OPTIMIZATION USING NONLINEAR PROGRAMMING AND COLLOCATION , 1987 .