Reduction of controlled Lagrangian and Hamiltonian systems with symmetry

This paper develops reduction theory for controlled Lagrangian and controlled Hamiltonian systems with symmetry. Reduction theory for these systems is needed in a variety of examples, such as a spacecraft with rotors, a heavy top with rotors, and underwater vehicle dynamics. One of our main results shows the equivalence of the method of reduced controlled Lagrangian systems and that of reduced controlled Hamiltonian systems in the case of simple mechanical systems with symmetry.

Reduction of controlled Lagrangian and Hamiltonian systems with symmetry

Abstract: