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Matrix Diagonal Stability in Systems and Computation [electronic resource] /

by Eugenius Kaszkurewicz, Amit Bhaya.

Book Cover
Main Author: Kaszkurewicz, Eugenius.
Other Names: Bhaya, Amit.
Published: Boston, MA : Birkhäuser Boston : 2000.
Topics: Mathematics. | Matrix theory. | Computer science - Mathematics. | Numerical analysis.
Genres: Electronic books.
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020 |z1461213460
024 7 |a10.1007/978-1-4612-1346-8|2doi
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100 1 |aKaszkurewicz, Eugenius.
245 10|aMatrix Diagonal Stability in Systems and Computation|h[electronic resource] /|cby Eugenius Kaszkurewicz, Amit Bhaya.
260 |aBoston, MA :|bBirkhäuser Boston :|bImprint :|bBirkhäuser,|c2000.
300 |a1 online resource (xiv, 267 pages)
336 |atext|btxt|2rdacontent
337 |acomputer|bc|2rdamedia
338 |aonline resource|bcr|2rdacarrier
505 0 |a1 Diagonally Stable Structures in Systems and Computa tion -- 2 Matrix Diagonal and D-Stability -- 3 Mathematical Models Admitting Diagonal-Type Lia punov Functions -- 4 Convergence of Asynchronous Iterative Methods -- 5 Neural Networks, Circuits, and Systems -- 6 Interconnected Systems: Stability and Stabilization -- Epilogue -- References.
520 |aThis monograph presents a collection of results, observations, and examples related to dynamical systems described by linear and nonlinear ordinary differential and difference equations. In particular, dynamical systems that are susceptible to analysis by the Liapunov approach are considered. The naive observation that certain "diagonal-type" Liapunov functions are ubiquitous in the literature attracted the attention of the authors and led to some natural questions. Why does this happen so often? What are the spe cial virtues of these functions in this context? Do they occur so frequently merely because they belong to the simplest class of Liapunov functions and are thus more convenient, or are there any more specific reasons? This monograph constitutes the authors' synthesis of the work on this subject that has been jointly developed by them, among others, producing and compiling results, properties, and examples for many years, aiming to answer these questions and also to formalize some of the folklore or "cul ture" that has grown around diagonal stability and diagonal-type Liapunov functions. A natural answer to these questions would be that the use of diagonal type Liapunov functions is frequent because of their simplicity within the class of all possible Liapunov functions. This monograph shows that, although this obvious interpretation is often adequate, there are many in stances in which the Liapunov approach is best taken advantage of using diagonal-type Liapunov functions. In fact, they yield necessary and suffi cient stability conditions for some classes of nonlinear dynamical systems.
650 0|aMathematics.
650 0|aMatrix theory.
650 0|aComputer science|xMathematics.
650 0|aNumerical analysis.
655 4|aElectronic books.
700 1 |aBhaya, Amit.
710 2 |aSpringerLink (Online service)
776 08|iPrint version:|z9781461271055
791 2 |aSpringerLink (Online service)
852 8 |beresour-nc|hOnline Resource|t1|zAccessible anywhere on campus or with UIUC NetID
856 40|3SpringerLink - Full text online|uhttp://www.library.illinois.edu/proxy/go.php?url=http://dx.doi.org/10.1007/978-1-4612-1346-8|xUIU
994 |aC0|bUIU

Staff View for: Matrix Diagonal Stability in Systems and