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SIAMCO
2002

Robust Optimal Switching Control for Nonlinear Systems

14 years 3 days ago
Robust Optimal Switching Control for Nonlinear Systems
Abstract. We formulate a robust optimal control problem for a general nonlinear system with finitely many admissible control settings and with costs assigned to switching of controls. We formulate the problem both in an L2-gain/dissipative system framework and in a game-theoretic framework. We show that, under appropriate assumptions, a continuous switching-storage function is characterized as a viscosity supersolution of the appropriate system of quasivariational inequalities (the appropriate generalization of the Hamilton-Jacobi-Bellman-Isaacs equation for this context), and that the minimal such switching-storage function is equal to the continuous switching lower-value function for the game. Finally we show how a prototypical example with one-dimensional state space can be solved by a direct geometric construction. Key Words. running cost, switching cost, worst-case disturbance attenuation, differential game, state-feedback control, nonanticipating strategy, storage function, lower...
Joseph A. Ball, Jerawan Chudoung, Martin V. Day
Added 23 Dec 2010
Updated 23 Dec 2010
Type Journal
Year 2002
Where SIAMCO
Authors Joseph A. Ball, Jerawan Chudoung, Martin V. Day
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