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Table of Contents
Intro
Preface
Contents
1 Background Materials From Analysis
1.1 Introduction
1.2 Vector-Valued Measures
1.3 Multi Valued Functions
1.4 Bibliographical Notes
2 Measure Solutions for Deterministic Evolution Equations
2.1 Evolution Equations with Continuous Vector Fields
2.1.1 Motivation
2.1.2 Introduction
2.2 Evolution Equations Under Relaxed Hypothesis
2.2.1 Competing Notions of Solutions
2.2.2 Quasilinear Problems
2.3 Evolution Equations with Measurable Vector Fields
2.3.1 Introduction
2.3.2 Existence of Measure Solutions
2.3.3 Differential Equations on the Space of Measures
2.4 Bibliographical Notes
3 Measure Solutions for Impulsive Systems
3.1 Introduction
3.2 Spaces of Measure-Valued Functions
3.3 Measure-Valued Solutions
3.3.1 Existence of Measure Solutions
3.3.2 Measure Solutions vs. Pathwise Solutions
3.4 Differential Equations on the Space of Measures
3.5 Differential Inclusions
3.5.1 Classical Model
3.5.2 General Model
3.6 Bibliographical Notes
4 Measure Solutions for Stochastic Systems
4.1 Introduction
4.2 Existence of Measure Solutions
4.2.1 Martingale vs. Generalized Solutions
4.2.2 Some Illustrative Examples
4.3 Stochastic Systems Driven by Martingale Measures
4.3.1 Special Vector Spaces
4.3.2 Some Basic Properties of the Martingale Measure M
4.3.3 Basic Formulation of the System
4.3.4 Existence of Measure Solutions
4.4 Extension to Measurable Vector Fields
4.5 Bibliographical Notes
5 Measure Solutions for Neutral Evolution Equations
5.1 Introduction
5.2 Basic Background Materials
5.3 Existence of Measure Solutions and Their Regularity
5.4 Stochastic Neutral Systems
5.4.1 Basic Background Materials
5.4.2 Existence of Measure Solutions and Their Regularity
5.5 Second Order Neutral Differential Equations
5.5.1 Introduction
5.5.2 Some Basic Notations
5.5.3 System Models
5.5.4 System Models Generating C0-Group
5.5.5 Existence and Regularity of Solutions
5.6 Stochastic Second Order Neutral Systems
5.7 Bibliographical Notes
6 Optimal Control of Evolution Equations
6.1 Optimal Control of Deterministic Systems
6.2 Optimal Control of Impulsive Systems
6.3 Optimal Control of Stochastic Systems
6.4 Optimal Control of Neutral Systems
6.4.1 Deterministic Neutral Systems (DNS)
6.4.2 Stochastic Neutral Systems (SNS)
6.5 Bibliographical Notes
7 Examples From Physical Sciences
7.1 Nonlinear Schrödinger Equation
7.1.1 Basic Formulation of the System Model
7.1.2 Existence and Uniqueness of Solutions
7.2 Stochastic Navier-Stokes Equation
7.3 Reaction Diffusion Equation (Biomedical Application)
7.4 Bibliographical Notes
Reference
Index
Preface
Contents
1 Background Materials From Analysis
1.1 Introduction
1.2 Vector-Valued Measures
1.3 Multi Valued Functions
1.4 Bibliographical Notes
2 Measure Solutions for Deterministic Evolution Equations
2.1 Evolution Equations with Continuous Vector Fields
2.1.1 Motivation
2.1.2 Introduction
2.2 Evolution Equations Under Relaxed Hypothesis
2.2.1 Competing Notions of Solutions
2.2.2 Quasilinear Problems
2.3 Evolution Equations with Measurable Vector Fields
2.3.1 Introduction
2.3.2 Existence of Measure Solutions
2.3.3 Differential Equations on the Space of Measures
2.4 Bibliographical Notes
3 Measure Solutions for Impulsive Systems
3.1 Introduction
3.2 Spaces of Measure-Valued Functions
3.3 Measure-Valued Solutions
3.3.1 Existence of Measure Solutions
3.3.2 Measure Solutions vs. Pathwise Solutions
3.4 Differential Equations on the Space of Measures
3.5 Differential Inclusions
3.5.1 Classical Model
3.5.2 General Model
3.6 Bibliographical Notes
4 Measure Solutions for Stochastic Systems
4.1 Introduction
4.2 Existence of Measure Solutions
4.2.1 Martingale vs. Generalized Solutions
4.2.2 Some Illustrative Examples
4.3 Stochastic Systems Driven by Martingale Measures
4.3.1 Special Vector Spaces
4.3.2 Some Basic Properties of the Martingale Measure M
4.3.3 Basic Formulation of the System
4.3.4 Existence of Measure Solutions
4.4 Extension to Measurable Vector Fields
4.5 Bibliographical Notes
5 Measure Solutions for Neutral Evolution Equations
5.1 Introduction
5.2 Basic Background Materials
5.3 Existence of Measure Solutions and Their Regularity
5.4 Stochastic Neutral Systems
5.4.1 Basic Background Materials
5.4.2 Existence of Measure Solutions and Their Regularity
5.5 Second Order Neutral Differential Equations
5.5.1 Introduction
5.5.2 Some Basic Notations
5.5.3 System Models
5.5.4 System Models Generating C0-Group
5.5.5 Existence and Regularity of Solutions
5.6 Stochastic Second Order Neutral Systems
5.7 Bibliographical Notes
6 Optimal Control of Evolution Equations
6.1 Optimal Control of Deterministic Systems
6.2 Optimal Control of Impulsive Systems
6.3 Optimal Control of Stochastic Systems
6.4 Optimal Control of Neutral Systems
6.4.1 Deterministic Neutral Systems (DNS)
6.4.2 Stochastic Neutral Systems (SNS)
6.5 Bibliographical Notes
7 Examples From Physical Sciences
7.1 Nonlinear Schrödinger Equation
7.1.1 Basic Formulation of the System Model
7.1.2 Existence and Uniqueness of Solutions
7.2 Stochastic Navier-Stokes Equation
7.3 Reaction Diffusion Equation (Biomedical Application)
7.4 Bibliographical Notes
Reference
Index