Agrawal and N. Faiz. A New Efficient Method for Optimisation of a Class of Nonlinear Systems without Lagrange Multipliers A Higher-Order Method for Dynamic Optimisation of a Class of Linear Time-Invariant Dynamic Systems A new higher-order method for optimisation of a class of linear time-varying dynamic systems, An Integrated Approach to Flight Control Design Using Dynamic InversionRXUQDORIG\QDPLFV\VWHPV 0HDVXUHPHQWV DQGG FRQWURO 7UDQVDFWLRQV RI $60 5REXVWHVVH HW &RPPDQGH2SWLPDOH. CÉPADUÈS ÉDITIONS, 1999. [6] P. Apkarian, J. M. Biannic, and P. Gahinet. Self-Scheduled H? Control of a Missile via Linear Matrix Inequalities. -RXUQRI*XLGDQFH&RQWURODQG'\Q. Self-scheduled H? Control of linear Parameter-varying Systems: a Design Example. $XWRPDWLFD Apkarian. P. Gahinet. A convex characterization of gain-scheduled H? controllers. ,(((7UDQVDFWLRQVRQDXWRPDWLFFRQWURO. [9] E. Aranda-Bricaire, C. H. Moog and J.-B Pomet. An Infinitesimal Brunovsky Form for Nonlinear Systems with Application to Dynamic Linearization. ,Q*HRPHWU\LQ 1RQOLQHDU &RQWURO DQGG 'LIIHUHQWLDO ,QFOXVLRQV SS %DQDFKK &HQWHU 3XEOLFDWLRQV, pp.1385-1389, 1993. ,
A linear algebraic framework for dynamic feedback, pp.127-132, 1983. ,
Flight Control Law Design for a Civil Aircraft using Robust Dynamic, pp.998-1004, 1998. ,
Commande monovariable robuste + ? et QFT, pp.159-178, 1994. ,
Frequential synthesis of robust multiple reference model control, QQ3URF$PHULFDQQ&RQWURO&RQIHUHQFH, pp.3041-3043, 1990. ,
Comment on 'The spectral analysis of point processes ,
Ecole Nationale Supérieure de l'Aéronautique et de l, Thèse de doctorat, 1996. ,
Modelling and control of a 2 d.O.F high precision positioning system, 3URF(&&, pp.1009-1010 ,
Feedback invariant for nonlinear systems, pp.1115-1120, 1978. ,
A Lïe-Bäcklund approach to equivalence and flatness of nonlinear systems. A classification of linear controllable systems Nonlinear control law design for high angle-of-attack flight.-RXUQDORI*XLGDQFH&RQWURODQG, 23] C. I. Byrnes, A. Isidori. Exact linearization and zeros dynamics. 3URF WKK ,((( &RQI'HFLVLRQ&RQWURO, pp.173-188, 1970. ,
Sur l'équivalence absolue de certains systèmes d'équations différentielles et sur certaines familles de courves [25] E. Cartan. Sur l'intégration de certains systèmes indéterminés d'équations différentielles, Also in OEuvres Complètes, part IIIU UHLQH XQGG DQJHZ 0DWK Also in OEuvres Complètes, part II Thèse de Doctorat, pp.12-481133, 1914. ,
Sufficient conditions for dynamic state feedback linearization. 6,$0-&RQWURODQG2SWLPLVDWLRQ Differential flatness and control of induction motors, 3URF RI WKH V\PSRVLXP RQQ FRQWURO RSWLPLVDWLRQQ DQG 6XSHUYLVLRQ; &RPSXWDWLRQDO (QJLQHHULQJJ LQQ 6\VWHP $SSOLFDWLRQV, pp.38-57, 1989. ,
DOI : 10.1137/0329002
Linearization with dynamic compensation, pp.200-204, 1987. ,
New flatness conditions for control systems Robustness analysis of nonlinear dynamic inversion control laws with application to flight control, pp.168-173, 1999. ,
Modelling and control of an overhead crane Full Linearization of a class of mechanical systems via dynamic state feedback, 3URF ,QW6\PSRVLXP0716, pp.523-529, 1989. ,
Expérimentation d'un observateur Hinfini LPV pour la machine asynchroneCommande et observation de la machine asynchrone -Résultats expérimentaux Control of flat systems by quasi-static feedback of generalized states, Darengosse et Ph. Chevrel39] S. Devasia. Nonlinear Inversion-based Output Tracking. ,((( 7UDQVDFWLRQQ 2Q $XWRPDWLF&RQWURO, pp.641-655, 1996. ,
Analysis of feedback systems with structured uncertainties, Modified randomization tests for nonparametric hypotheses. $QQDOV RI 0DWKHPDWLFDO6WDWLVWLFV28, pp.45-56, 1957. ,
DOI : 10.1049/ip-d.1982.0053
Control of rational systems using linear fractional representations and linear matrix inequalities. $XWRPDWLFD Optimal control of 2-input Chained systems using Higher-Order Method Robustness in the presence of mixed parametric uncertainty and unmodeled dynamics, $PHULFDQ&RQWUROFRQIHUHQFH, vol.36, pp.1273-1284, 1991. ,
Sur les systèmes non linéaires différentiellement plats. &5$FDG6FL. Paris, I-315 On differentially flat nonlinear systems, Q3URF,)$&6\PSRVLXP12/&2649] M. Fliess, J. Lévine, Ph. Martin, and P. Rouchon. Linéarisation par bouclage dynamique et transformations de Lie-Bäcklund. &5$FDG6FL. Paris. I-317, pp.619-624, 1992. ,
Flatness and defect of non-linear systems: introductory theory and examples, QW -RXUQDO RI &RQWURO, pp.61-1327, 1995. ,
DOI : 10.1109/9.73561
Towards a new differential geometric setting in nonlinear control, 1993. ,
Affine parameter-dependant Lyapunov functions and real parametric uncertainty, pp.436-442, 1996. ,
DOI : 10.1109/9.486646
Atmospheric Guidance Concepts for an Aeroassisted Experiment, 7KH-RXUQDORIWKH$VWURQDXWLFDO6FLHQFHV, pp.45-71, 1988. ,
Exact feedforward linearization based on differential flatness: The SISO case, 57] V. Hagenmeyer. 3RXUVXLWHGHWUDMHFWRLUHSDUFRPPDQGHQRQQOLQpDLUHUREXVWHIRQGpH VXUODSODWLWXGHGLIIpUHQWLHOOH Thèse de doctorat1RQOLQHDUDQGGDGDSWLYH, pp.161-170, 1963. ,
Exact feed-forward linearization based on differential flatness. $XWRPDWLFD Re-entry Targeting philosophy and Flight Results from APOLLO 10 and 11, pp.70-98, 1941. ,
Global transformations of nonlinear systems Design for multi-input nonlinear systems Differential geometric control theory, pp.24-31, 1983. ,
[72] T On the equivalence of control systems and linearization of nonlinear systems. 6,$0-RXUQDORI&RQWURODQG2SWLPLVDWLRQ, Partial and robust Linearization by Feedback. 3URFQG,(((&RQI'HFLVLRQ&RQWU76] S. H. Lane and R.F. Stengel. Flight control using nonlinear inverse dynamics, pp.1510-1513, 1973. ,
Satellite path planning by flatness approach The Hague, The Netherlands, Thèse de doctorat, pp.422-427, 2003. ,
An analytical method of estimating the domain of attraction for polynomial differential equations, IEEE Transactions on Automatic Control, vol.39, issue.12, 1994. ,
DOI : 10.1109/9.362845
On flatness necessary and sufficient conditions. WKK ,)$& V\PSRVLXP 1ROFRV, 2004. ,
On the control of US navy cranes. 3URFRI(&& , Brussels, Belgium, paper n° 717 Flat output characterization for linear systems using polynomial matrices Robustness analysis and synthesis for uncertain nonlinear systems, pp.69-75, 1994. ,
On the largest feedback linearizable subsystem, Systems & Control Letters, vol.6, issue.5, pp.345-351, 1986. ,
DOI : 10.1016/0167-6911(86)90130-1
[87] Ph. Martin and P. Rouchon. Systems without drift and flatness, pp.347-348, 1992. ,
Any controllable drifftless system with P inputs and P+2 states is flat, 3URFHHGLQJV RI WKH WKK ,((( &RQIHUHQFH RQQ 'HFLVLRQQ DQG &RQWURO pp, pp.2886-2891, 1995. ,
Any controllable drifftless system with 3 inputs and 5 states is flat, pp.167-173, 1995. ,
Application of nonlinear transformations to automatic flight control Nonlinear flying quality parameters based dynamic inversion Nonlinear control of mechanical systems: A Lagrangian perspective, QQ ,)$& 6\PSRVLXP RQQ1RQOLQHDU&RQWURO 6\VWHPV 'HVLJQQ 12/&26, pp.378-389, 1984. ,
Collocation and inversion for a re-entry optimal control problem Tailless Aircraft Control Law Using Dynamic Inversion & µ-synthesis, pp.15-16, 1996. ,
Approximate trajectory generation for differentially flat systems with zeros dynamics, pp.4224-4230, 1995. ,
Real time trajectory generation for differentially flat systems.,)$&:RUOG&RQJUHVV, 1996. ,
Gain scheduling via linear fractional transformations, Systems & Control Letters, vol.22, issue.2, pp.79-92, 1994. ,
DOI : 10.1016/0167-6911(94)90102-3
The complex structured singular value. $XWRPDWLFD 29, pp.71-109, 1993. ,
Flatness of nonlinear control systems: a Cartan-Käler approach, 2000. ,
Navigation, Guidance and Control of the Atmospheric Re-entry Demonstrator, LQ3URFUGG(6$,QWHUQDWLRQDO &RQIHUHQFH RQQ 6SDFHFUDIW *XLGDQFH 1DYLJDWLRQ DQGG &RQWURO 6\VWHPV, 1996. ,
On dynamic feedback linearization of four-dimensional affine control systems with two inputs, ESAIM: Control, Optimisation and Calculus of Variations, vol.2, issue.6, 1997. ,
DOI : 10.1051/cocv:1997107
URL : https://hal.archives-ouvertes.fr/inria-00073941
Robust tracking via the Robust Multiple Reference 3URF, pp.584-589, 1995. ,
Configuration flatness of Lagrangian systems underactuated by one control, pp.164-179, 1998. ,
On a Certain Linear Fractional Transformation, 0DWK $QG 3K\V, pp.269-286, 1960. ,
DOI : 10.1002/sapm1960391269
Adaptative On-board Guidance for Entry Vehicle, 2001. ,
Digital flatness-based robust controller applied to a thermal process, Proceedings of the 2001 IEEE International Conference on Control Applications (CCA'01) (Cat. No.01CH37204), pp.936-941, 2001. ,
DOI : 10.1109/CCA.2001.973990
Systems without drift and flatness, pp.3-0716 ,
Necessary condition and genericity of dynamic feedback linearization, pp.345-358, 1994. ,
Flatness based control of a nonlinear chemical reactor model, Automatica, vol.32, issue.10, pp.637-642, 1995. ,
DOI : 10.1016/0005-1098(96)00090-8
Research on gain scheduling, Automatica, vol.36, issue.10, pp.1401-1425, 2000. ,
DOI : 10.1016/S0005-1098(00)00058-3
URL : http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.409.6064
LPV control and full block multipliers, Automatica, vol.37, issue.3, pp.361-375, 2001. ,
DOI : 10.1016/S0005-1098(00)00176-X
Absolute equivalence and dynamic feedback linearization, Systems & Control Letters, vol.15, issue.1, pp.35-39, 1990. ,
DOI : 10.1016/0167-6911(90)90041-R
Analysis of gain scheduled control for nonlinear plants, IEEE Transactions on Automatic Control, vol.35, issue.8, pp.898-907, 1990. ,
DOI : 10.1109/9.58498
Gain scheduling: potential hazards and possible remedies, IEEE Control Systems, vol.12, issue.3, pp.101-107, 1992. ,
DOI : 10.1109/37.165527
On-Board Generation of three-Dimensional Constrained Entry Trajectories. -RXUQDORI*XLGDQFH&RQWURODQG'\QDPLFVvol, pp.111-121, 2003. ,
Differentially Flat Systems. Marcel Dekker edition, 2004. ,
A necessary condition for dynamic feedback linearization, Systems & Control Letters, vol.21, issue.4, pp.277-283, 1993. ,
DOI : 10.1016/0167-6911(93)90069-I
Robustness Analysis for Real and Complex Perturbations applied to an Electro-Mechanical System, pp.556-561, 1991. ,
On linearization technique in robust nonlinear ??? control, Systems & Control Letters, vol.27, issue.1, pp.21-27, 1996. ,
DOI : 10.1016/0167-6911(95)00034-8
(QWU\)OLJKW 0HFKDQLFs The university of, p.3, 1980. ,
Commande Robuste à Modèles de Références Multiples, application à une table de découpe, Thèse, 1992. ,
LPV Modeling of Atmospheric Re-entry Demonstrator for Guidance Re-entry Problem, Proceedings of the 44th IEEE Conference on Decision and Control ,
DOI : 10.1109/CDC.2005.1583359
URL : https://hal.archives-ouvertes.fr/hal-00243128
Robust tracking of nonlinear MIMO uncertain flat systems The Hague, The Netherlands, pp.536-541, 2004. ,
Modélisation des systèmes non linéaires plats perturbés mono-entrée sous forme LPV, pp.22-24, 2004. ,