[1]
J. Ezzine and A. H. Haddad, Controllability and observability of hybrid systems,, Int. J. Control, vol. 49, no. 6, p.2045–2055, Jun. (1989).
DOI: 10.1080/00207178908559761
Google Scholar
[2]
G. Xie and D. Zheng, Research on controllability and reachability of hybrid systems,, in Chinese Control Conf, 2000, p.114–117.
Google Scholar
[3]
Z. Sun, S. S. Ge, and T. H. Lee, Controllability and reachability criteria for switched linear systems,, Automatica, vol. 38, p.775–786, (2002).
DOI: 10.1016/s0005-1098(01)00267-9
Google Scholar
[4]
G. Xie and L. Wang, Controllability and stabilizability of switched linear-systems,, Syst. Control Lett., vol. 48, no. 2, p.135–155, Feb. (2003).
DOI: 10.1016/s0167-6911(02)00288-8
Google Scholar
[5]
G. Stikkel, J. Bokor, and Z. Szabó, Necessary and sufficient condition for the controllability of switching linear hybrid systems,, Automatica, vol. 40, no. 6, p.1093–1097, (2004).
DOI: 10.1016/j.automatica.2004.01.011
Google Scholar
[6]
Z. Yang, An algebraic approach towards the controllability of controlled switching linear hybrid systems,, Automatica, vol. 38, no. 7, p.1221–1228, (2002).
DOI: 10.1016/s0005-1098(02)00010-9
Google Scholar
[7]
R. Vidal, A. Chiuso, S. Soatto, and S. Sastry, Observability of linear hybrid systems,, Hybrid Syst. Comput. Control. Proc., vol. 2623, p.526–539, (2003).
DOI: 10.1007/3-540-36580-x_38
Google Scholar
[8]
W. M. Wonham, Linear Multivariable Control: a Geometric Approach, 2nd ed. Springer-Verlag New York, (1979).
Google Scholar
[9]
K. J. Reinschke and G. Wiedemann, Digraph characterization of structural controllability for linear descriptor systems,, Linear Algebra Appl., vol. 266, no. Supplement C, p.199–217, (1997).
DOI: 10.1016/s0024-3795(97)86521-4
Google Scholar
[10]
C. Sueur and G. Dauphin-Tanguy, Structural controllability/observability of linear systems represented by bond graphs,, J. Franklin Inst., vol. 326, no. 6, p.869–883, (1989).
DOI: 10.1016/0016-0032(89)90009-4
Google Scholar
[11]
H. Hihi, Structural controllability of switching linear systems,, J. Comput., vol. 4, no. 12, p.1286–1293, (2009).
Google Scholar
[12]
A. Rahmani, C. Sueur, and G. Dauphin-Tanguy, Pole assignment for systems modelled by bond graph,, J. Franklin Inst., vol. 331, no. 3, p.299–312, (1994).
DOI: 10.1016/0016-0032(94)90102-3
Google Scholar
[13]
J. Buisson, Analysis of switching devices with bond graphs,, J. Franklin Inst., vol. 330, no. 6, p.1165–1175, (1993).
DOI: 10.1016/0016-0032(93)90070-b
Google Scholar
[14]
G. Dauphin-Tanguy and C. Rombaut, Why a unique causality in the elementary commutation cell bond graph model of a power electronics converter,, in Proceedings of IEEE Systems Man and Cybernetics Conference - SMC, 1993, p.257–263 vol.1.
DOI: 10.1109/icsmc.1993.384754
Google Scholar
[15]
H. Hihi, M. Bendaoud, and A. Rahmani, Modelling and structural observability of switching linear hybrid singular systems,, Int. J. Model. Identif. Control, vol. 27, no. 4, p.279–292, (2017).
DOI: 10.1504/ijmic.2017.10005529
Google Scholar
[16]
A. Rahmani and G. Dauphin-Tanguy, Structural analysis of switching systems modelled by bond graph,, Math. Comput. Model. Dyn. Syst., vol. 12, no. 2–3, p.235–247, (2006).
DOI: 10.1080/1383950500068344
Google Scholar
[17]
C. Sueur and G. Dauphin-Tanguy, Bond-graph approach for structural analysis of MIMO linear systems,, J. Franklin Inst., vol. 328, no. 1, p.55–70, (1991).
DOI: 10.1016/0016-0032(91)90006-o
Google Scholar
[18]
C. Sueur and G. D. Tanguy, Bond graph determination of controllability subspaces for pole assignment,, in Proceedings of IEEE Systems Man and Cybernetics Conference - SMC, 1993, p.14–19 vol.1.
DOI: 10.1109/icsmc.1993.384712
Google Scholar
[19]
M. Bendaoud, H. Hihi, and K. Faitah, Graphical conditions for R-controllability of generalized linear switching systems,, in 2014 International Conference on Control, Decision and Information Technologies (IEEE CoDIT), 2014, p.459–464.
DOI: 10.1109/codit.2014.6996937
Google Scholar
[20]
L. Dai, Singular Control Systems, no. 118. Springer-Verlag Berlin Heidelberg, (1989).
Google Scholar
[21]
R. A, C. Sueur, and G. Dauphin-Tanguy, Formal determination of controllability and observability matrices for multivariable systems modelled by bond graph,, in IMACS-SICE, International Symposium on Robotics, Mechatronics and Manufacturing Systems, (1992).
Google Scholar
[22]
J. Buisson, H. Cormerais, M. Zainea, H. Gueguen, and E. Godoy, Formal approach to compute hybrid automata models for linear physical systems with switches,, in 2004 IEEE International Conference on Robotics and Automation (IEEE Cat. No.04CH37508), 2004, p.47.
DOI: 10.1109/cacsd.2004.1393849
Google Scholar
[23]
H. Hihi and A. Rahmani, Graphical modelling of hybrid systems,, in CSC, (2007).
Google Scholar