Title :
The Extended Symplectic Pencil and the Finite-Horizon LQ Problem With Two-Sided Boundary Conditions
Author :
Ferrante, Augusto ; Ntogramatzidis, Lorenzo
Author_Institution :
Dipt. di Ing. dell´Inf., Univ. di Padova, Padua, Italy
Abstract :
This technical note introduces a new approach to the solution of a very general class of finite-horizon optimal control problems for discrete-time systems. This approach provides a parametric expression for the optimal control sequences, as well as the corresponding optimal state trajectories, by exploiting a new decomposition of the so-called extended symplectic pencil. This decomposition provides an original strategy for a more direct solution of the problem with no need of the system-theoretic hypotheses (including regularity of the symplectic pencil) that have always been assumed in the literature so far.
Keywords :
difference equations; discrete time systems; linear quadratic control; discrete-time system; extended symplectic pencil decomposition; finite-horizon LQ problem; finite-horizon optimal control; linear quadratic control; optimal control sequence; optimal state trajectory; parametric expression; system-theoretic hypothesis; two-sided boundary condition; Boundary conditions; Eigenvalues and eigenfunctions; Matrix decomposition; Optimal control; Riccati equations; Trajectory; End-point constraints; extended symplectic pencil; finite-horizon LQ problems; generalized Riccati equations;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2013.2244292
