On the state-space design of optimal controllers for distributed systems with finite communication speed

We consider the problem of designing optimal distributed controllers whose impulse response has limited propagation speed. We introduce a state-space framework in which such controllers can be described. We show that the optimal control problem is not convex with respect to certain state-space design parameters, and demonstrate a reasonable relaxation that renders the problem convex. This relaxation is associated with an iterative numerical scheme known as the Steiglitz-McBride (SM) algorithm. We improve the SM algorithm by using the algebraic Lyapunov equation to relieve time integration, thus significantly reducing computational costs.

[1]  J. Doyle,et al.  Robust and optimal control , 1995, Proceedings of 35th IEEE Conference on Decision and Control.

[2]  Bogdan Dumitrescu,et al.  Multistage IIR filter design using convex stability domains defined by positive realness , 2004, IEEE Transactions on Signal Processing.

[3]  Fernando Paganini,et al.  Convex synthesis of localized controllers for spatially invariant systems , 2002, Autom..

[4]  Sanjay Lall,et al.  A Characterization of Convex Problems in Decentralized Control$^ast$ , 2005, IEEE Transactions on Automatic Control.

[5]  Bruce A. Francis,et al.  Optimal Sampled-Data Control Systems , 1996, Communications and Control Engineering Series.

[6]  A. Rantzer,et al.  A Separation Principle for Distributed Control , 2006, Proceedings of the 45th IEEE Conference on Decision and Control.

[7]  A. Rantzer Linear quadratic team theory revisited , 2006, 2006 American Control Conference.

[8]  L. Mcbride,et al.  A technique for the identification of linear systems , 1965 .

[9]  Petros G. Voulgaris,et al.  A convex characterization of distributed control problems in spatially invariant systems with communication constraints , 2005, Syst. Control. Lett..

[10]  Geir E. Dullerud,et al.  Distributed control design for spatially interconnected systems , 2003, IEEE Trans. Autom. Control..

[11]  B. Francis,et al.  A Course in H Control Theory , 1987 .

[12]  Fernando Paganini,et al.  Distributed control of spatially invariant systems , 2002, IEEE Trans. Autom. Control..

[13]  Petros G. Voulgaris,et al.  Optimal H2 controllers for spatially invariant systems with delayed communication requirements , 2003, Syst. Control. Lett..