Multiple-arc optimization of low-thrust earth-moon orbit transfers leveraging implicit costate transformation

TL;DR

This paper develops a novel multiple-arc optimization method for low-thrust Earth-Moon transfers, using implicit costate transformation to simplify the solution process within a high-fidelity multibody dynamical framework.

Contribution

It introduces a closed-form solution for intermediate conditions in multiple-arc orbit transfers, leveraging implicit costate transformation to reduce problem complexity.

Findings

Closed-form solution for intermediate optimality conditions

Effective use of multiple-arc formulation with different coordinate representations

Successful application of heuristic algorithms for high-fidelity trajectory optimization

Abstract

This work focuses on minimum-time low-thrust orbit transfers from a prescribed low Earth orbit to a specified low lunar orbit. The well-established indirect formulation of minimum-time orbit transfers is extended to a multibody dynamical framework, with initial and final orbits around two distinct primaries. To do this, different representations, useful for describing orbit dynamics, are introduced, i.e., modified equinoctial elements (MEE) and Cartesian coordinates (CC). Use of two sets of MEE, relative to either Earth or Moon, allows simple writing of the boundary conditions about the two celestial bodies, but requires the formulation of a multiple-arc trajectory optimization problem, including two legs: (a) geocentric leg and (b) selenocentric leg. In the numerical solution process, the transition between the two MEE representations uses CC, which play the role of convenient intermediate, matching variables. The multiple-arc formulation at hand leads to identifying a set of intermediate necessary conditions for optimality, at the transition between the two legs. This research proves that a closed-form solution to these intermediate conditions exists, leveraging implicit costate transformation. As a result, the parameter set for an indirect algorithm retains the reduced size of the typical set associated with a single-arc optimization problem. The indirect heuristic technique, based on the joint use of the necessary conditions and a heuristic algorithm (i.e., differential evolution in this study) is proposed as the numerical solution method, together with the definition of a layered fitness function, aimed at facilitating convergence. The minimum-time trajectory of interest is sought in a high-fidelity dynamical framework, with the use of planetary ephemeris and the inclusion of the simultaneous gravitational action of Sun, Earth, and Moon, along the entire transfer path.