# Invariance Entropy for Deterministic Control Systems [electronic resource] :An Introduction /

##### by Kawan, Christoph [author.]; SpringerLink (Online service).

Material type: BookSeries: Lecture Notes in Mathematics: 2089Publisher: Cham : Springer International Publishing : 2013.Description: XXII, 270 p. 2 illus., 1 illus. in color. online resource.ISBN: 9783319012889.Subject(s): Mathematics | Differentiable dynamical systems | Systems theory | Mathematics | Dynamical Systems and Ergodic Theory | Systems Theory, ControlDDC classification: 515.39 | 515.48 Online resources: Click here to access onlineItem type | Current location | Call number | Status | Date due | Barcode |
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E-Books |
Central Library, IISER Bhopal
OPAC URL: http://webopac.iiserb.ac.in/ |
515.39 515.48 (Browse shelf) | Not for loan |

Basic Properties of Control Systems -- Introduction to Invariance Entropy -- Linear and Bilinear Systems -- General Estimates -- Controllability, Lyapunov Exponents, and Upper Bounds -- Escape Rates and Lower Bounds -- Examples -- Notation -- Bibliography -- Index.

This monograph provides an introduction to the concept of invariance entropy, the central motivation of which lies in the need to deal with communication constraints in networked control systems. For the simplest possible network topology, consisting of one controller and one dynamical system connected by a digital channel, invariance entropy provides a measure for the smallest data rate above which it is possible to render a given subset of the state space invariant by means of a symbolic coder-controller pair. This concept is essentially equivalent to the notion of topological feedback entropy introduced by Nair, Evans, Mareels and Moran (Topological feedback entropy and nonlinear stabilization. IEEE Trans. Automat. Control 49 (2004), 1585–1597). The book presents the foundations of a theory which aims at finding expressions for invariance entropy in terms of dynamical quantities such as Lyapunov exponents. While both discrete-time and continuous-time systems are treated, the emphasis lies on systems given by differential equations.

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