Nonlinear H-Infinity Control, Hamiltonian Systems and Hamilton-Jacobi Equations

5.3 Robust Nonlinear $H_{\infty}$ State-Feedback Control

In this section, we consider the state-feedback $H_{\infty}$ -control problem for the affine nonlinear system Σ^a in the presence of unmodelled dynamics and/or parameter variations. This problem has been considered in many references [6, 7, 209, 223, 245, 261, 265, 284]. The approach presented here is based on [6, 7] and is known as guaranteed-cost control. It is an extension of quadratic-stabilization, and was first developed by Chang [78] and later popularized by Petersen [226, 227, 235]. For this purpose, the system is represented by the model:

$Σ_{Δ}^{a} : {\begin{cases} \dot{x} = f (x) + Δ f (x, θ, t) + g_{1} (x) w + [g_{2} (x) + Δ g_{2} (x, θ, t)] u; \\ x (t_{0}) = x_{0} \\ y = x \\ z = [\begin{array}{l} h_{1} (x) \\ u \end{array}] \end{cases}$

(5.41)

where all the variables ...

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