H2 optimization for systems with adobe input delays: A loop shifting approach

This paper studies the H^2 optimization problem for systems with adobe input delay. These are systems having only two (possibly vector) input channels: one is delay free and the other is delayed. We present a solution based on the reduction of the problem to an equivalent delay-free problem via simple loop shifting arguments. This results in a solution based on two standard algebraic Riccati equations, which are associated with the delay-free version of the problem. The optimal controller is in the dead-time compensator form. We also derive an explicit and transparent expression for the cost of delay and (in the case when the problem is solvable without the delayed channel) a numerically stable form of the optimal solution, which includes exponentials of Hurwitz matrices only. The approach is readily extendible to more general multiple input/output delay cases.

[1]  Kenji Kashima,et al.  A new expression for the H2 performance limit based on state-space representation , 2007, 2007 European Control Conference (ECC).

[2]  Leonid Mirkin,et al.  H2 and Hinfinity Design of Sampled-Data Systems Using Lifting. Part II: Properties of Systems in the Lifted Domain , 1999, SIAM J. Control. Optim..

[3]  Moustafa A. Soliman,et al.  Optimal feedback control for linear-quadratic systems having time delays† , 1972 .

[4]  Leonid Mirkin,et al.  Dead-Time Compensation for Systems With Multiple I/O Delays: A Loop-Shifting Approach , 2011, IEEE Transactions on Automatic Control.

[5]  Gjerrit Meinsma,et al.  H2-optimal control of systems with multiple i/o delays: Time domain approach , 2005, Autom..

[6]  Leonid Mirkin,et al.  On the approximation of distributed-delay control laws , 2004, Syst. Control. Lett..

[7]  David J. N. Limebeer,et al.  Linear Robust Control , 1994 .

[8]  Guang-Ren Duan,et al.  Linear quadratic regulation for linear time-varying systems with multiple input delays part II: continuous-time case , 2006, 2005 International Conference on Control and Automation.

[9]  Akira Kojima,et al.  Formulas on Preview and Delayed $H^{\infty}$ Control , 2006, IEEE Transactions on Automatic Control.

[10]  Leonid Mirkin,et al.  Every stabilizing dead-time controller has an observer-predictor-based structure , 2003, Autom..

[11]  G. Tadmor Optimal controls and their discontinuities in quadratic problems of delay systems , 1985 .

[12]  Leonid Mirkin,et al.  Control Issues in Systems with Loop Delays , 2005, Handbook of Networked and Embedded Control Systems.

[13]  Gjerrit Meinsma,et al.  On H/sub 2/ control of systems with multiple I/O delays , 2006, IEEE Transactions on Automatic Control.

[14]  Leiba Rodman,et al.  Algebraic Riccati equations , 1995 .

[15]  Gene H. Golub,et al.  Matrix computations , 1983 .

[16]  L. Mirkin,et al.  H/sup /spl infin// control of systems with multiple I/O delays via decomposition to adobe problems , 2005, IEEE Transactions on Automatic Control.