Dissipativity of Pseudorational Behaviors

Author

Ogura, M. ; Yamamoto, Yusaku

Author_Institution

Dept. of Math. & Stat., Texas Tech Univ., Lubbock, TX, USA

Volume

58

Issue

4

fYear

2013

fDate

Apr-13

Firstpage

823

Lastpage

833

Abstract

This paper studies dissipativity for a class of infinite-dimensional systems, called pseudorational, in the behavioral context. Extending the finite-dimensional counterpart, we show that a pseudorational behavior is dissipative if and only if it admits a storage function or a dissipation function. For its proof, we derive a new necessary and sufficient condition for entire functions of exponential type in the so called Paley-Wiener class to allow a symmetric factorization. Characterization of dissipative behaviors and linear quadratic optimal behaviors are also given.

Keywords

frequency-domain analysis; multidimensional systems; Paley-Wiener functions; behavioral context; dissipation function; exponential type functions; finite-dimensional counterpart; infinite-dimensional systems; linear quadratic optimal behaviors; pseudorational behaviors dissipativity; storage function; symmetric factorization; Convolution; Ducts; Image representation; Laplace equations; Mathematical model; Polynomials; Symmetric matrices; Behavioral systems; dissipativity; infinite-dimensional systems; pseudorationality; symmetric factorization;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/TAC.2012.2219980

Filename

6308697