Functional Differential Equations: Application of i-smooth calculus / Edition 1by A.V. Kim, A. V. Kim, V. a. Kim
Pub. Date: 05/31/1999
Publisher: Springer Netherlands
This book is unique in its separation of finite and infinite dimensional components in the structures of
This monograph presents the basics of i-smooth calculus, a new differential calculus of nonlinear functionals based on the notion of invariant derivative, and its application to some problems of the qualitative theory of functional differential equations.
This book is unique in its separation of finite and infinite dimensional components in the structures of functional differential equations and functionals, as well as in its use of conditional representation of FDEs, which is expedient for the application of methods and constructions of i-smooth calculus.
Part I contains a foundation of i-smooth calculus. Part II is an introduction to FDEs based on i-smooth calculus. Part III describes the direct Lyapunov method for systems with delays in terms of i- smooth functionals. Part IV considers an approach to the development of a dynamical programming method for systems with delays in terms of i-smooth Bellman's functionals.
Audience: This volume will be of interest to students and researchers in mathematics, applied mathematicians, and engineers whose work involves ordinary differential equations, functional analysis, partial differential equations, optimal control and mathematics systems theory.
Table of ContentsPreface. Part I: i-Smooth Calculus. 1. Structure of Functionals. 2. Properties of Functionals. Invariant Derivative. 3. Generalized Derivatives of Nonlinear Functionals. Part II: Functional Differential Equations. 4. Functional Differential Equations. 5. Neutral Functional Differential Equations. Part III: Direct Lyapunov Method for Systems with Delays. 6. The Problem Statement. 7. The Lyapunov Functional Method. 8. The Lyapunov Function Method. 9. Instability. Part IV: Dynamical Programming Method for Systems with Delays. 10. Systems with State Delays. 11. Systems with Control Delays. References. Index.
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