A reformulation of augmented basic interpolation problem and an application to <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" altimg="si1.gif" overflow="scroll"><mml:msub><mml:mrow><mml:mi mathvariant="script">H</mml:mi></mml:mrow><mml:mrow><mml:mo>∞</mml:mo></mml:mrow></mml:msub></mml:math> control

Stefanovski, Jovan

doi:10.1016/j.laa.2015.07.018

Cited by 2 publications

(3 citation statements)

References 25 publications

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“…Proof Proposition 2 is actually Theorem 1 in [25]. Note that in Theorem 1 in [25], A is an arbitrary matrix (not satisfying Assumption 1).…”

Section: Propositionmentioning

confidence: 99%

“…Proof Proposition 2 is actually Theorem 1 in [25]. Note that in Theorem 1 in [25], A is an arbitrary matrix (not satisfying Assumption 1). By Proposition 2, we see that, taking D 1, the interpolation conditions (2.2), (2.3), (2.4), and k 1 U k 1 6 1 coincide with the interpolation conditions of the problem aBIP.…”

Section: Propositionmentioning

confidence: 99%

“…In the following proposition, we consider proper solutions U to Problem .Proposition Given arbitrary γ > 0, and matrices A ,

C = ([], \begin{matrix} C_{1} \\ C_{2} \end{matrix})

and R satisfying , a proper stable RM U satisfies the conditions , , and if and only if it is proper and stable and satisfies the conditions , , and

\frac{1}{2 π normalj} \int_{- normalj \infty}^{normalj \infty} {bold-italic Θ}^{♯} C^{*} ([], \begin{matrix} I_{m} & - γ^{- 1} U \\ - γ^{- 1} U^{♯} & I_{p} \end{matrix}) C bold-italic Θ normald s = R,

where the notation

\int_{- normalj \infty}^{normalj \infty}

means

\lim_{L↑∞} \int_{- normalj L}^{normalj L}

.Proof Proposition is actually Theorem 1 in . Note that in Theorem 1 in , A is an arbitrary matrix (not satisfying Assumption ). □…”

Section: Interpolation With Scripth∞‐constraint and Application In Omentioning

confidence: 99%

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New interpolation solution and application in system modeling and optimal control with prescribed distance to instability

Stefanovski

2015

Intl J Robust & Nonlinear

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Summary We present a system theoretic interpretation of a two‐sided interpolation problem with a stable rational matrix U (interpolant) without constraints on its norm. It is known that all solutions U of that problem can be expressed as U = Uh+Up, where Uh ranges in the set of all solutions of the associated homogeneous problem, and Up is a particular solution. We present a new solution for Up and prove that it is actually the minimal scriptH2‐norm interpolant in the set of all interpolants. We apply these results in system modeling and in optimal scriptH∞ control of one‐block plants, with a prescribed bound on the distance to instability of the closed‐loop system. The applications are illustrated by examples. Interesting connections to the augmented basic interpolation problem, to Nehari's problem, and to the stability of one‐block plants with multiple unstable invariant zeros are given. Copyright © 2015 John Wiley & Sons, Ltd.

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“…Proof Proposition 2 is actually Theorem 1 in [25]. Note that in Theorem 1 in [25], A is an arbitrary matrix (not satisfying Assumption 1).…”

Section: Propositionmentioning

confidence: 99%

Section: Propositionmentioning

confidence: 99%

“…In the following proposition, we consider proper solutions U to Problem .Proposition Given arbitrary γ > 0, and matrices A ,

C = ([], \begin{matrix} C_{1} \\ C_{2} \end{matrix})

and R satisfying , a proper stable RM U satisfies the conditions , , and if and only if it is proper and stable and satisfies the conditions , , and

\frac{1}{2 π normalj} \int_{- normalj \infty}^{normalj \infty} {bold-italic Θ}^{♯} C^{*} ([], \begin{matrix} I_{m} & - γ^{- 1} U \\ - γ^{- 1} U^{♯} & I_{p} \end{matrix}) C bold-italic Θ normald s = R,

where the notation

\int_{- normalj \infty}^{normalj \infty}

means

\lim_{L↑∞} \int_{- normalj L}^{normalj L}

.Proof Proposition is actually Theorem 1 in . Note that in Theorem 1 in , A is an arbitrary matrix (not satisfying Assumption ). □…”

Section: Interpolation With Scripth∞‐constraint and Application In Omentioning

confidence: 99%

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New interpolation solution and application in system modeling and optimal control with prescribed distance to instability

Stefanovski

2015

Intl J Robust & Nonlinear

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Further Results on the Convergence of the Pavon–Ferrante Algorithm for Spectral Estimation

Baggio

2018

IEEE Trans. Automat. Contr.

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A reformulation of augmented basic interpolation problem and an application to H∞ control

Cited by 2 publications

References 25 publications

New interpolation solution and application in system modeling and optimal control with prescribed distance to instability

New interpolation solution and application in system modeling and optimal control with prescribed distance to instability

Further Results on the Convergence of the Pavon–Ferrante Algorithm for Spectral Estimation

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