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Weakly Connected Nonlinear Systems

Anatoly Martynyuk | Larisa Chernetskaya | Vladislav Martynyuk
€248.00
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?21 Cos ?1t
A01=Anatoly Martynyuk
A01=Larisa Chernetskaya
A01=Vladislav Martynyuk
advanced control systems
Asymptotically Stable
Author_Anatoly Martynyuk
Author_Larisa Chernetskaya
Author_Vladislav Martynyuk
Auxiliary Functions
Banach Space
Banach space applications
Category=PBKF
Category=PBKJ
Category=PBW
Category=PH
Category=PSA
Comparison Function
Connection Functions
derivative
dini
Dini Derivative
dxs
Dxs Dt
eq_bestseller
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
eq_non-fiction
eq_science
exponential
Full Derivative
function
Function V
Function Vi
Inequality Holds
Initial Point
Integral Inequalities
Isolated Subsystems
lyapunov
Lyapunov Function
mathematical modeling theory
Maximum Solution
Measures ?0
Measures Ρ0
motion
nonlinear dynamical systems
nonlinear system stability research
Ordinary Differential Equations
perturbed
Perturbed Motion
Positive Definite Function
Positive Semidefinite
Scalar Lyapunov Function
small parameter perturbation
stability
stability analysis methods
Trivial Solution
vector
Vector Lyapunov Function
Ω21 Cos Ν1t

Product details

  • ISBN 9781466570863
  • Weight: 580g
  • Dimensions: 156 x 234mm
  • Publication Date: 20 Nov 2012
  • Publisher: Taylor & Francis Inc
  • Publication City/Country: US
  • Product Form: Hardback
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Description

Weakly Connected Nonlinear Systems: Boundedness and Stability of Motion provides a systematic study on the boundedness and stability of weakly connected nonlinear systems, covering theory and applications previously unavailable in book form. It contains many essential results needed for carrying out research on nonlinear systems of weakly connected equations.

After supplying the necessary mathematical foundation, the book illustrates recent approaches to studying the boundedness of motion of weakly connected nonlinear systems. The authors consider conditions for asymptotic and uniform stability using the auxiliary vector Lyapunov functions and explore the polystability of the motion of a nonlinear system with a small parameter. Using the generalization of the direct Lyapunov method with the asymptotic method of nonlinear mechanics, they then study the stability of solutions for nonlinear systems with small perturbing forces. They also present fundamental results on the boundedness and stability of systems in Banach spaces with weakly connected subsystems through the generalization of the direct Lyapunov method, using both vector and matrix-valued auxiliary functions.

Designed for researchers and graduate students working on systems with a small parameter, this book will help readers get up to date on the knowledge required to start research in this area.

About Anatoly Martynyuk | Larisa Chernetskaya | Vladislav Martynyuk
Martynyuk, Anatoly; Chernetskaya, Larisa; Martynyuk, Vladislav

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