TY - JOUR
T1 - Optimal Control of a Constrained Bilinear Dynamic System
AU - Halperin, Ido
AU - Agranovich, Grigory
AU - Ribakov, Yuri
N1 - Publisher Copyright:
© 2017, Springer Science+Business Media New York.
PY - 2017/9/1
Y1 - 2017/9/1
N2 - In this paper, an optimal feedback, for a free vibrating semi-active controlled plant, is derived. The problem is represented as a constrained optimal control problem of a single input, free vibrating bilinear system, and a quadratic performance index. It is solved by using Krotov’s method and to this end, a novel sequence of Krotov functions that suits the addressed problem, is derived. The solution is arranged as an algorithm, which requires solving the states equation and a differential Lyapunov equation in each iteration. An outline of the proof for the algorithm convergence is provided. Emphasis is given on semi-active control design for stable free vibrating plants with a single control input. It is shown that a control force, derived by the proposed technique, obeys the physical constraint related with semi-active actuator force without the need of any arbitrary signal clipping. The control efficiency is demonstrated with a numerical example.
AB - In this paper, an optimal feedback, for a free vibrating semi-active controlled plant, is derived. The problem is represented as a constrained optimal control problem of a single input, free vibrating bilinear system, and a quadratic performance index. It is solved by using Krotov’s method and to this end, a novel sequence of Krotov functions that suits the addressed problem, is derived. The solution is arranged as an algorithm, which requires solving the states equation and a differential Lyapunov equation in each iteration. An outline of the proof for the algorithm convergence is provided. Emphasis is given on semi-active control design for stable free vibrating plants with a single control input. It is shown that a control force, derived by the proposed technique, obeys the physical constraint related with semi-active actuator force without the need of any arbitrary signal clipping. The control efficiency is demonstrated with a numerical example.
KW - Bilinear quadratic regulator
KW - Feedback
KW - Krotov’s method
KW - Optimal control
KW - Semi-active structural control
UR - http://www.scopus.com/inward/record.url?scp=85015169168&partnerID=8YFLogxK
U2 - 10.1007/s10957-017-1095-2
DO - 10.1007/s10957-017-1095-2
M3 - ???researchoutput.researchoutputtypes.contributiontojournal.article???
AN - SCOPUS:85015169168
SN - 0022-3239
VL - 174
SP - 803
EP - 817
JO - Journal of Optimization Theory and Applications
JF - Journal of Optimization Theory and Applications
IS - 3
ER -