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Stability: Elements of the Theory and Applications with Examples
This book is intended to familiarize the readers with basic concepts, and classic results of stability theory stated in a way as required by the rigorous rules of contemporary mathematics and, simultaneously, to introduce the learners to broad elds of not only the stability theory but also applications involved. The emphasis is put on various dynamical systems which are defined by different branches of science and through diverse areas of human activity but always with care not to exceed the basic classical approach in the presentation.
Frontmatter
Preface
Contents
1. Stability - What Is It, and What Is It For?
2. Linear Equations with Constant Coefficients
3. Nonlinear Integral Inequalities in the Stability Theory
4. Lyapunov Direct Method
5. Comparison Method and Stability of Motion
6. Stability Domains
7. Stability of Manifolds - Selected Subjects
8. Stability of Difference Equations
9. Stability in Delay Differential Equations
10. Stability of Partial Differential Equations
11. Stochastic Stability
12. Lyapunov Exponents and Chaotic Systems
References
Index
Frontmatter
Preface
Contents
1. Stability - What Is It, and What Is It For?
2. Linear Equations with Constant Coefficients
3. Nonlinear Integral Inequalities in the Stability Theory
4. Lyapunov Direct Method
5. Comparison Method and Stability of Motion
6. Stability Domains
7. Stability of Manifolds - Selected Subjects
8. Stability of Difference Equations
9. Stability in Delay Differential Equations
10. Stability of Partial Differential Equations
11. Stochastic Stability
12. Lyapunov Exponents and Chaotic Systems
References
Index