Results 281 to 290 of about 3,330,411 (337)

An "exceptional" magnetic sensor. [PDF]

Light Sci Appl
Yi Z, Agarwal GS, Scully MO.
europepmc   +1 more source

Sampling zero stability in sampled data control systems with delays using backward triangle sample and hold. [PDF]

Sci Rep
Ou M, Luo Y, Yan Z, Deng Y, Zhou Y, Zeng C.   +5 more
europepmc   +1 more source

Enhanced FPGA-based smart power grid simulation using Heun and Piecewise analytic method. [PDF]

Sci Rep
Gul U, Raza Ur Rehman HM, Gul MJ, Mezquita GM, Barrera AEP, Ashraf I.   +5 more
europepmc   +1 more source

On the controllability and the stabilizability of linear systems [PDF]

IEEE Transactions on Automatic Control, 1975
The controllability and the stabilizability of linear time variable systems are considered. It is shown that the controllability and the stabilizability of the ( n-m ) dimensional subsystem assure that of the original system, respectively, where n denotes the dimension of the state space and m denotes the number of the input.
M. Suzuki, M. Kono, S. Hosoe, S. Niwa
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Controllability of Linear Systems

2016
We study the controllability of linear systems–the existence of processes and their construction according with specified conditions on the ends of a trajectory. The criteria of point-to-point and complete controllability are established. We investigate the features for non-controllability of the systems.
Leonid T. Ashchepkov, Dmitriy V. Dolgy, Taekyun Kim, Ravi P. Agarwal   +3 more
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On the controllability of switching linear systems

Automatica, 2005
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Vladimir M. Veliov, Mikhail Krastanov
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On the controllability of non-linear systems

Automatica, 1970
Some discussions for the controllability in non-linear control systems are presented. The control systems treated are described by ordinary differential equations. Several concepts concerning the controllability are introduced. If every initial state of the system can be transferred to the origin in a finite time, the system is called ''controllable''.
N. Adachi, Hidekatsu Tokumaru
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Perturbations of Linear Control Systems

SIAM Journal on Control, 1971
The purpose of this paper is to consider the controllability of linear control systems which are perturbations (with respect to $L^p $-norms) of controllable linear systems. We show that the set of all completely controllable linear systems is open and dense in the set of all linear control systems.
openaire   +3 more sources