Dual LMI approach to linear positive system analysis

Yoshio Ebihara

Dual LMI approach to linear positive system analysis

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution

Abstract

This paper is concerned with the dual-LMI-based analysis of linear positive systems. As the first contribution, we will show that the cerebrated Perron-Frobenius theorem can be proved concisely via a duality-based argument. On the other hand, in the second part of the paper, we extend the well-known result that a stable Metzler matrix admits a diagonal Lyapunov matrix as the solution of the Lyapunov inequality. More precisely, again via a duality-based argument, we will clarify a necessary and sufficient condition under which a stable Metzler matrix admits a diagonal Lyapunov matrix with some identical diagonal entries. This new result leads to an alternative proof for the recent result by Tanaka and Langbort on the existence of a diagonal Lyapunov matrix for the LMI characterizing the L₂ gain of positive systems.

Original language	English
Title of host publication	ICCAS 2012 - 2012 12th International Conference on Control, Automation and Systems
Pages	887-891
Number of pages	5
Publication status	Published - Dec 1 2012
Externally published	Yes
Event	2012 12th International Conference on Control, Automation and Systems, ICCAS 2012 - Jeju, Korea, Republic of Duration: Oct 17 2012 → Oct 21 2012

Publication series

Name	International Conference on Control, Automation and Systems
ISSN (Print)	1598-7833

Conference

Conference	2012 12th International Conference on Control, Automation and Systems, ICCAS 2012
Country/Territory	Korea, Republic of
City	Jeju
Period	10/17/12 → 10/21/12

All Science Journal Classification (ASJC) codes

Artificial Intelligence
Computer Science Applications
Control and Systems Engineering
Electrical and Electronic Engineering

Cite this

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title = "Dual LMI approach to linear positive system analysis",

abstract = "This paper is concerned with the dual-LMI-based analysis of linear positive systems. As the first contribution, we will show that the cerebrated Perron-Frobenius theorem can be proved concisely via a duality-based argument. On the other hand, in the second part of the paper, we extend the well-known result that a stable Metzler matrix admits a diagonal Lyapunov matrix as the solution of the Lyapunov inequality. More precisely, again via a duality-based argument, we will clarify a necessary and sufficient condition under which a stable Metzler matrix admits a diagonal Lyapunov matrix with some identical diagonal entries. This new result leads to an alternative proof for the recent result by Tanaka and Langbort on the existence of a diagonal Lyapunov matrix for the LMI characterizing the L2 gain of positive systems.",

author = "Yoshio Ebihara",

year = "2012",

month = dec,

day = "1",

language = "English",

isbn = "9781467322478",

series = "International Conference on Control, Automation and Systems",

pages = "887--891",

booktitle = "ICCAS 2012 - 2012 12th International Conference on Control, Automation and Systems",

note = "2012 12th International Conference on Control, Automation and Systems, ICCAS 2012 ; Conference date: 17-10-2012 Through 21-10-2012",

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T1 - Dual LMI approach to linear positive system analysis

AU - Ebihara, Yoshio

PY - 2012/12/1

Y1 - 2012/12/1

N2 - This paper is concerned with the dual-LMI-based analysis of linear positive systems. As the first contribution, we will show that the cerebrated Perron-Frobenius theorem can be proved concisely via a duality-based argument. On the other hand, in the second part of the paper, we extend the well-known result that a stable Metzler matrix admits a diagonal Lyapunov matrix as the solution of the Lyapunov inequality. More precisely, again via a duality-based argument, we will clarify a necessary and sufficient condition under which a stable Metzler matrix admits a diagonal Lyapunov matrix with some identical diagonal entries. This new result leads to an alternative proof for the recent result by Tanaka and Langbort on the existence of a diagonal Lyapunov matrix for the LMI characterizing the L2 gain of positive systems.

AB - This paper is concerned with the dual-LMI-based analysis of linear positive systems. As the first contribution, we will show that the cerebrated Perron-Frobenius theorem can be proved concisely via a duality-based argument. On the other hand, in the second part of the paper, we extend the well-known result that a stable Metzler matrix admits a diagonal Lyapunov matrix as the solution of the Lyapunov inequality. More precisely, again via a duality-based argument, we will clarify a necessary and sufficient condition under which a stable Metzler matrix admits a diagonal Lyapunov matrix with some identical diagonal entries. This new result leads to an alternative proof for the recent result by Tanaka and Langbort on the existence of a diagonal Lyapunov matrix for the LMI characterizing the L2 gain of positive systems.

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M3 - Conference contribution

AN - SCOPUS:84872589433

SN - 9781467322478

T3 - International Conference on Control, Automation and Systems

SP - 887

EP - 891

BT - ICCAS 2012 - 2012 12th International Conference on Control, Automation and Systems

T2 - 2012 12th International Conference on Control, Automation and Systems, ICCAS 2012

Y2 - 17 October 2012 through 21 October 2012

ER -

Dual LMI approach to linear positive system analysis

Abstract

Publication series

Conference

All Science Journal Classification (ASJC) codes

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