FINITE POLYNOMIAL ALGORITHM FOR COMPUTING THE LARGEST EIGENVALUE OF THE 'TOEPLITZ plus HANKEL' OPERATOR OF THE H infinity PROBLEM.

Edmond A. Jonckheere; Jyh-Chin Juang

FINITE POLYNOMIAL ALGORITHM FOR COMPUTING THE LARGEST EIGENVALUE OF THE 'TOEPLITZ plus HANKEL' OPERATOR OF THE H infinity PROBLEM.

Edmond A. Jonckheere, Jyh-Chin Juang

Department of Electrical Engineering

Research output: Contribution to journal › Article › peer-review

2 Citations (Scopus)

Abstract

A finite algorithm for computing the achievable feedback performance evaluated in the H infinity sense is constructed. This algorithm reduces the problem of evaluating the achievable performance to the computation of the zeros of a polynomial matrix. It is based on an unusual connection between the H infinity and linear-quadratic problems, namely, a Toeplitz plus Hankel operator shared by both problems.

Original language	English
Pages (from-to)	1816-1821
Number of pages	6
Journal	Proceedings of the IEEE Conference on Decision and Control
Publication status	Published - 1986

All Science Journal Classification (ASJC) codes

Chemical Health and Safety
Control and Systems Engineering
Safety, Risk, Reliability and Quality

Cite this

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abstract = "A finite algorithm for computing the achievable feedback performance evaluated in the H infinity sense is constructed. This algorithm reduces the problem of evaluating the achievable performance to the computation of the zeros of a polynomial matrix. It is based on an unusual connection between the H infinity and linear-quadratic problems, namely, a Toeplitz plus Hankel operator shared by both problems.",

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AU - Juang, Jyh-Chin

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N2 - A finite algorithm for computing the achievable feedback performance evaluated in the H infinity sense is constructed. This algorithm reduces the problem of evaluating the achievable performance to the computation of the zeros of a polynomial matrix. It is based on an unusual connection between the H infinity and linear-quadratic problems, namely, a Toeplitz plus Hankel operator shared by both problems.

AB - A finite algorithm for computing the achievable feedback performance evaluated in the H infinity sense is constructed. This algorithm reduces the problem of evaluating the achievable performance to the computation of the zeros of a polynomial matrix. It is based on an unusual connection between the H infinity and linear-quadratic problems, namely, a Toeplitz plus Hankel operator shared by both problems.

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JO - Proceedings of the IEEE Conference on Decision and Control

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FINITE POLYNOMIAL ALGORITHM FOR COMPUTING THE LARGEST EIGENVALUE OF THE 'TOEPLITZ plus HANKEL' OPERATOR OF THE H infinity PROBLEM.

Abstract

All Science Journal Classification (ASJC) codes

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