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Stabilizable by a stable and by an inverse stable but not by a stable and inverse stable

Bibliographic reference Blondel, Vincent ; Gevers, Michel ; Mortini, R. ; Rupp, R.. Stabilizable by a stable and by an inverse stable but not by a stable and inverse stable.Proceedings of 1992 31st IEEE Conference on Decision and Control (Tucson, AZ, USA, 16-18 December 1992). In: Proceedings of the 31st IEEE Conference on Decision and Control (Cat.No.92CH3229-2), IEEE1992, p.Vol. 1, p. 832-3
Permanent URL http://hdl.handle.net/2078.1/68250