Kaszkurewicz, Eugenius.

Matrix diagonal stability in systems and computation/ Eugenius Kaszkurewicz, Amit Bhaya. - Boston : Birkhäuser, c2000. - xiv, 267 p. : ill. ; 24 cm.

Includes bibliographical references (p. [232]-256) and index.

Diagonally Stable Structures in Systems and Computation

Robust Stability of a Mechanical System

The LotkaVolterra Ecosystem Model

Convergence of Asynchronous Computations

Global Stability of Neural Networks

Variable Structure Systems

Existence of DiagonalType Liapunov Functions

Notes and References

Notes and References

Summary of Liapunov Stability Theory

Convergence of Asynchronous Iterative Methods

A Mathematical Model for Asynchronous BlockIterations

Convergence Conditions for the Asynchronous Case

Convergence Conditions for the Synchronous Case

Asynchronous Iterations to Solve Almost Linear Equations

Parallel Asynchronous Team Algorithms

Matrix Diagonal and DStability

Basic Notation and Terminology

Basic Results on Hurwitz Diagonal and DStability

Special Classes of Hurwitz Diagonally Stable Matrices

Similarity for Hurwitz Diagonally Stable Matrices

Persistence of Diagonal Stability under Perturbations

Basic Results on Schur Diagonal and DStability

A Matrix Polytopic View of Schur Diagonal and DStability

Special Classes of Schur Diagonally Stable Matrices

Schur Diagonal and DStability for TwobyTwo Matrices

Nonnegative Matrices

Qualitatively Schur Stable Matrices

Testing for Diagonal and DStability

Notes and References

Summary of the Theory of the Liapunov Equation

Mathematical Models Admitting DiagonalType Liapunov Functions

ContinuousTime StateSpace Models and Stability Results

StateSpace Realization Procedures

DiscreteTime StateSpace Models and Stability Results

DiscreteTime Interval Systems

Models for Asynchronous Systems

DiscreteTime Systems with Delays

Neural Networks Circuits and Systems

A Global Stability Result

Refinements of the Global Stability Result

Persistence of Global Asymptotic Stability

DiscreteTime Neural Networks

Passive RLC Circuits

Digital Filters in StateSpace Description

TwoDimensional 2D Dynamical Systems

Trophic Chains and Communities with Vertical Structure

Notes and References

Interconnected Systems Stability and Stabilization

Absolute Stability of Interconnected Systems

Linearly Interconnected Lure Systems

Stabilization by Linear Feedback

Decentralized PowerFrequency Control of Power Systems

Notes and References



0817640886


Differentiable dynamical systems.
Matrices.
Stability.

515.352 / KAS/M