Lyapunov functions for infinite-dimensional systems

Maciej Kocan; Pierpaolo Soravia

doi:10.1006/jfan.2001.3910

Lyapunov functions for infinite-dimensional systems

Maciej Kocan, Pierpaolo Soravia^*

^*Corresponding author for this work

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

16 Citations (Scopus)

Abstract

We study Lyapunov functions for infinite-dimensional dynamical systems governed by general maximal monotone operators. We obtain a characterization of Lyapunov pairs by means of the associated Hamilton-Jacobi partial differential equations, whose solutions are meant in the viscosity sense, as evolved in works of Tataru and Crandall-Lions. Our approach also leads to a new sufficient condition for Lyapunov pairs, generalizing a classical result of Pazy.

Original language	English
Pages (from-to)	342-363
Number of pages	22
Journal	Journal of Functional Analysis
Volume	192
Issue number	2
DOIs	https://doi.org/10.1006/jfan.2001.3910
Publication status	Published - 10 Jul 2002
Externally published	Yes

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10.1006/jfan.2001.3910

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AB - We study Lyapunov functions for infinite-dimensional dynamical systems governed by general maximal monotone operators. We obtain a characterization of Lyapunov pairs by means of the associated Hamilton-Jacobi partial differential equations, whose solutions are meant in the viscosity sense, as evolved in works of Tataru and Crandall-Lions. Our approach also leads to a new sufficient condition for Lyapunov pairs, generalizing a classical result of Pazy.

KW - Accretive operators

KW - Lyapunov functionals

KW - Lyapunov method

KW - Nonlinear semigroups

KW - Optimality principles

KW - Stability

KW - Viscosity solutions

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EP - 363

JO - Journal of Functional Analysis

JF - Journal of Functional Analysis

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Lyapunov functions for infinite-dimensional systems

Abstract

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