Linear continuous-time systems / Lyubomir T. Gruyitch

By:

Grujić, Ljubomir T [VerfasserIn]

Resource type: Ressourcentyp: Buch (Online)Book (Online)Language: English Publisher: Boca Raton : CRC Press, 2017Description: 1 Online-Ressource (xxv, 469 pages)ISBN:

9781138039537

Subject(s):

Additional physical formats: 9781138039506 | 9781315175782 | Erscheint auch als: Linear continuous-time systems. Druck-Ausgabe Boca Raton : CRC Press, Taylor & Francis Group, 2017. xxv, 469 SeitenDDC classification:

515/.39

MSC: MSC: *93-02 | 93C05 | 93C15 | 93D05 | 37B25 | 93C35RVK: RVK: SK 520LOC classification:

TJ220

Online resources:

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Summary: 3.7.3 ISO systems3.7.4 IIO systems; 4: Transfer function matrix G(s); II: FULL TRANSFER FUNCTION MATRIX F(S) AND SYSTEM REALIZATION; 5: Problem statement; 6: Nondegenerate matrices; 7: Defnition of F(s); 7.1 Defnition of F(s) in general; 7.2 Defnition of F(s) of the IO system; 7.3 Defnition of F(s) of the ISO system; 7.4 Defnition of F(s) of the IIO system; 8: Determination of F(s); 8.1 F(s) of the IO system; 8.2 F(s) of the ISO system; 8.3 F(s) of the IIO system; 8.4 Conclusion: Common general form of F(s); 9: Full block diagram algebra; 9.1 Introduction; 9.2 Parallel connectionSummary: 9.3 Connection in series9.4 Feedback connection; 10: Physical meaning of F(s); 10.1 The IO system; 10.2 The ISO system; 10.3 The IIO system; 11: System matrix and equivalence; 11.1 System matrix of the IO system; 11.2 System matrix of the ISO System; 11.3 System matrix of the IIO system; 12: Realizations of F(s); 12.1 Dynamical and least dimension of a system; 12.2 On realization and minimal realization; 12.2.1 Minimal realization of the transfer function matrix; 12.2.2 Realization and minimal realization of the full transfer function matrix and the systemSummary: "This book aims to help the reader understand the linear continuous-time time-invariant dynamical systems theory and its importance for systems analysis and design of the systems operating in real conditions, i.e., in forced regimes under arbitrary initial conditions. It introduces the concept of the system full matrix P(s) in the complex domain and establishes its link with the system full transfer function matrix F(s). The text also establishes the full block diagram technique based on the use of F(s), which incorporates the Laplace transform of the input vector and the vector of all initial conditions. It explores the direct relationship between the system full transfer function matrix F(s) and the Lyapunov stability concept, definitions and conditions, as well as with the BI stability concept, definitions, and conditions. The goal of the book is to unify the study and applications of all three classes of the of the linear continuous-time time-invariant systems, for short systems"--PPN: PPN: 898093562Package identifier: Produktsigel: ZDB-4-NLEBK

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