MaoX.KololevaN.RodkinaA.‘Robust stability of uncertain stochastic differential delay equation.’Syst. Control Lett.35 (2) (1998): 325–336
2.
VerriestE. I.FlorchingerP.‘Stability of stochastic systems with uncertain time delays.’Syst. Control Lett.24 (1) (1995): 41–47
3.
FlorchingerP.‘Lyapunov-like techniques for stochastic stability.’ In Proceedings of the 33rd IEEE Conference onDecision and control, Lake Buena Vista, Florida, December 1994, pp. 1145–1150 (IEEE Press, Piscataway, New Jersey).
4.
SandellN. R.VaraiyaP.AthansM.SafonovM. G.‘Survey of decentralized control method for large-scale system.’IEEE Trans. Autom. Control23 (2) (1978): 108–128
5.
JamshidiM.Large-scale systems: modeling, control, and fuzzy logic (1997): 229–280 (Prentice Hall, New Jersey).
6.
WuW. B.ChenP. C.ChenG.ChangK. Y.ChangY. H.‘Multiobjective state-feedback control for stochastic large-scale system via LMI approach.’J. Chung Cheng Instt. Technol.34 (2) (2006): 1–20
7.
XieS.XieL.‘Stabilisation of a class of uncertain large-scale stochastic system with time delays.’Automatica36 (1) (2000): 161–167
8.
XuS.ChenT.‘Robust H∞ control for uncertain stochastic system with state delay.’IEEE Trans. Autom. Control47 (12) (2002): 2089–2094
9.
XieS.XieL.WenC.‘DecentralizedH∞ output feedback control of interconnected time-delay systems.’ In Proceedings of the American control conference, Chicago, Illinois, June 2000, pp. 824–828 (American Automatic Control Council, Dayton, Ohio).
10.
CollinsE. G.SkeltonR. E.‘A theory of state covariance assignment for discrete systems.’IEEE Trans. Autom. Control32 (1) (1987): 35–41
11.
SreeramV.LiuW. Q.‘Theory of state covariance assignment for linear single-input systems.’IEE Proc. D: Control Theory Appl.41 (3) (1996): 289–295
12.
WuW. B.ChenP. C.ChenG.ChangY. H.‘LMI decentralized controller design for stochastic large-scale time-delay systems.’ In Proceeding of the 2004 IEEE International Conference onControl applications, Taipei, ROC.
13.
WuW. B.ChenP. C.ChenG.ChangK. Y.ChangY. H.‘Multiobjective state-feedback control for stochastic large-scale system via LMI approach.’Proc. IMechE, Part I: J. Systems and Control Engineering221 (I1) (2007): 1047–1060
14.
SchererC.GahinetP.ChilaliM.‘Multiobjective output-feedback control via LMI optimization.’IEEE Trans. Autom. Control42 (7) (1997): 896–911
15.
VandenbergheL. V.BalakrishnanV. K.‘Algorithm and software for LMI problems in control.’IEEE Control Syst. Lect. Notes17 (1) (1997): 89–95
16.
ChilaliM.GahientP.‘H∞ design with pole placement constraints: an LMI approach.’IEEE Trans. Autom. Control41 (3) (1996): 358–367
17.
ChilaliM.GahientP.‘Robust pole placement in LMI regions.’IEEE Trans. Autom. Control44 (12) (1999): 2257–2269
18.
HuZ.‘Decentralized stabilisation of large-scale interconnected systems with delays.’IEEE Trans. Autom. Control39 (2) (1994): 180–182
19.
BoydS.GhaouiL. E.FeronE.BalakrishnanV.Linear matrix inequality in system and control theory (1994): 7–35 (SIAM, Philadelphia, Pennsylvania).
20.
GahinetP.NemirovskiA.LaubA. J.ChilaliM., LMI control toolbox for use with MATLAB, The Math Work Inc., Natick, Massachusetts, 1995, pp. 4–1-5-6.
21.
KharitonovV. L.ZhabkoA. P.‘Lyapunov-Krasovskii approach to the robust stability analysis of time-delay systems.’Automatica39 (1) (2003): 15–20
22.
ChangK. Y.WangW. J.‘H∞ norm constraint and variance control for stochastic uncertain large-scale systems via sliding mode concept.’IEEE Trans. Circuits Syst. Part I: Fundam. Theory Appl.46 (10) (1999): 1275–1280
23.
BoukasE. K.LiuZ. K.Deterministic and stochastic time delay systems (2002): 177–183 (Birkhäuser, Boston, Massachusetts).
24.
Khas'miniskiiR. Z.Stochastic stability of differential equations (1980): 25–35 (S & N International, Rockville, Maryland).
25.
WangY.XieL.De SouzaC. E.‘Robust control of a class of uncertain nonlinear systems.’Syst. Control Lett.19 (1) (1992): 139–149
