Adaptative high-gain extended Kalman filter and applications
Adaptative high-gain extended Kalman filter and applications
Adaptative high-gain extended Kalman filter and applications
Create successful ePaper yourself
Turn your PDF publications into a flip-book with our unique Google optimized e-Paper software.
tel-00559107, version 1 - 24 Jan 2011<br />
REFERENCES<br />
[46] F. Deza, E. Busvelle, <strong>and</strong> J-P. Gauthier. Exponentially converging observers for distillation<br />
columns <strong>and</strong> internal stability of the dynamic output feedback. Chemical<br />
Engineering Science, 47(15/16), 1992. 20<br />
[47] F. Deza, E. Busvelle, J-P. Gauthier, <strong>and</strong> D. Rakotopara. High-<strong>gain</strong> estimation for<br />
nonlinear systems. Systems <strong>and</strong> control letters, 18:295–299, 1992. x, 11, 20, 21, 22, 38,<br />
40<br />
[48] J. L. Doob. The brownian movement <strong>and</strong> stochastic equations. Annals of Math.,<br />
43:351–369, 1942. 164<br />
[49] R. Durett. Stochastic Calculus, A practical introduction. CRC Press, 1996. 162<br />
[50] F. Esf<strong>and</strong>iari <strong>and</strong> H. K. Khalil. Output feedback stabilization of fully linearizable<br />
systems. International Journal of Control, 56:1007–1037, 1992. 20, 28<br />
[51] M. Farza, M. M’Saad, <strong>and</strong> L. Rossignol. Observer design for a class of mimo nonlinear<br />
systems. Automatica, 40:135–143, 2004. 93<br />
[52] J-P. Gauthier <strong>and</strong> G. Bornard. Observability for any u(t) of a class of nonlinear systems.<br />
IEEE Transactions on Automatic Control, 26(4):922–926, 1981. 11<br />
[53] J-P. Gauthier, H. Hammouri, <strong>and</strong> I. Kupka. Observers for nonlinear systems. In IEEE<br />
CDC conference, pages 1483–1489, 1991. 11<br />
[54] J-P. Gauthier, H. Hammouri, <strong>and</strong> S. Othman. A simple observer for nonlinear systems<br />
<strong>applications</strong> to bioreactors. IEEE Transactions on Automatic Control, 37(6):875–880,<br />
1992. x, 11, 20<br />
[55] J-P. Gauthier <strong>and</strong> I. Kupka. Observability <strong>and</strong> observers for nonlinear systems. SIAM<br />
Journal on Control, 32(4):975–994, 1994.<br />
[56] J-P. Gauthier <strong>and</strong> I. Kupka. Observability with more outputs than inputs. Mathematische<br />
Zeitschrift, 223:47–78, 1996. 11<br />
[57] J-P. Gauthier <strong>and</strong> I. Kupka. Deterministic Observation Theory <strong>and</strong> Applications. Cambridge<br />
University Press, 2001. x, xi, 4, 11, 14, 15, 17, 21, 40, 42, 47, 93, 96, 98, 115,<br />
116, 125, 128, 131, 144<br />
[58] A. Gelb, editor. Applied Optimal Estimation. The MIT Press, 1974. x, xvii, 3, 5, 6, 20,<br />
30<br />
[59] D. T. Gillespie. Exact numerical simulation of the ornstein-uhlenbeck process <strong>and</strong> its<br />
integral. Physical Review E, 54(2):2084–2091, 1996. 162, 163<br />
[60] M. S. Grewal, L. Weill, <strong>and</strong> A. P. Andrews. Global Positioning Systems, Inertial Navigation<br />
<strong>and</strong> Integration. John Wiley <strong>and</strong> Sons, 2007. 20, 22, 30<br />
[61] L. Z. Guo <strong>and</strong> Q. M. Zhu. A fast convergent <strong>extended</strong> kalman observer for nonlinear<br />
discrete-time systems. International of Systems Science, 33(13):1051–1058, 2002. 34<br />
168
Change language