Difference between revisions of "Book:Martin Bohner/Dynamic Equations on Time Scales"
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===Contents=== | ===Contents=== | ||
| + | :Preface | ||
| + | :Chapter 1. The Time Scales Calculus | ||
| + | ::1.1. Basic Definitions | ||
| + | ::1.2. Differentiation | ||
| + | ::1.3. Examples and Applications | ||
| + | ::1.4. Integration | ||
| + | ::1.5. Chain Rules | ||
| + | ::1.6. Polynomials | ||
| + | ::1.7. Further Basic Results | ||
| + | ::1.8. Notes and References | ||
| + | :Chapter 2. First Order Linear Equations | ||
| + | ::2.1. Hilger's Complex Plane | ||
| + | ::2.2. The Exponential Function | ||
| + | ::2.3. Examples of Exponential Functions | ||
| + | ::2.4. Initial Value Problems | ||
| + | ::2.5. Notes and References | ||
| + | :Chapter 3. Second Order Linear Equations | ||
| + | ::3.1. Wronskians | ||
| + | ::3.2. Hyperbolic and Trigonometric Functions | ||
| + | ::3.3. Reduction of Order | ||
| + | ::3.4. Method of Factoring | ||
| + | ::3.5. Nonconstant Coefficients | ||
| + | ::3.6. Hyperbolic and Trigonometric Functions II | ||
| + | ::3.7. Euler-Cauchy Equations | ||
| + | ::3.8. Variation of Parameters | ||
| + | ::3.9. Annihilator Method | ||
| + | ::3.10. Laplace Transform | ||
| + | ::3.11. Notes and References | ||
| + | :Chapter 4. Self-Adjoint Equations | ||
| + | ::4.1. Preliminaries and Examples | ||
| + | ::4.2. The Riccati Equation | ||
| + | ::4.3. Disconjugacy | ||
| + | ::4.4. Boundary Value Problems and Green's Function | ||
| + | ::4.5. Eigenvalue Problems | ||
| + | ::4.6. Notes and References | ||
| + | :Chapter 5. Linear Systems and Higher Order Equations | ||
| + | ::5.1. Regressive Matrices | ||
| + | ::5.2. Constant Coefficients | ||
| + | ::5.3. Self-Adjoint Matrix Equations | ||
| + | ::5.4. Asymptotic Behavior of Solutions | ||
| + | ::5.5. Higher Order Linear Dynamic Equations | ||
| + | ::5.6. Notes and References | ||
| + | :Chapter 6. Dynamic Inequalities | ||
| + | ::6.1. Gronwall's Inequality | ||
| + | ::6.2. Hölder's and Minkowski's Inequalities | ||
| + | ::6.3. Jensen's Inequality | ||
| + | ::6.4. Opial Inequalities | ||
| + | ::6.5. Lyapunov Inequalities | ||
| + | ::6.6. Upper and Lower Solutions | ||
| + | ::6.7. Notes and References | ||
| + | :Chapter 7. Linear Symplectic Dynamic Systems | ||
| + | ::7.1. Symplectic Systems and Special Cases | ||
| + | ::7.2. Conjoined Bases | ||
| + | ::7.3. Transformation Theory and Trigonometric Systems | ||
| + | ::7.4. Notes and References | ||
| + | :Chapter 8. Extensions | ||
| + | ::8.1. Measure Chains | ||
| + | ::8.2. Nonlinear Theory | ||
| + | ::8.3. Alpha Derivatives | ||
| + | ::8.4. Nabla Derivatives | ||
| + | ::8.5. Notes and References | ||
| + | :Solutions to Selected Problems | ||
| + | :Bibliography | ||
| + | :Index | ||
Revision as of 03:19, 10 June 2016
Martin Bohner and Allan Peterson: Dynamic Equations on Time Scales
Online versions
Chapters 1-3 hosted by Martin Bohner
Contents
- Preface
- Chapter 1. The Time Scales Calculus
- 1.1. Basic Definitions
- 1.2. Differentiation
- 1.3. Examples and Applications
- 1.4. Integration
- 1.5. Chain Rules
- 1.6. Polynomials
- 1.7. Further Basic Results
- 1.8. Notes and References
- Chapter 2. First Order Linear Equations
- 2.1. Hilger's Complex Plane
- 2.2. The Exponential Function
- 2.3. Examples of Exponential Functions
- 2.4. Initial Value Problems
- 2.5. Notes and References
- Chapter 3. Second Order Linear Equations
- 3.1. Wronskians
- 3.2. Hyperbolic and Trigonometric Functions
- 3.3. Reduction of Order
- 3.4. Method of Factoring
- 3.5. Nonconstant Coefficients
- 3.6. Hyperbolic and Trigonometric Functions II
- 3.7. Euler-Cauchy Equations
- 3.8. Variation of Parameters
- 3.9. Annihilator Method
- 3.10. Laplace Transform
- 3.11. Notes and References
- Chapter 4. Self-Adjoint Equations
- 4.1. Preliminaries and Examples
- 4.2. The Riccati Equation
- 4.3. Disconjugacy
- 4.4. Boundary Value Problems and Green's Function
- 4.5. Eigenvalue Problems
- 4.6. Notes and References
- Chapter 5. Linear Systems and Higher Order Equations
- 5.1. Regressive Matrices
- 5.2. Constant Coefficients
- 5.3. Self-Adjoint Matrix Equations
- 5.4. Asymptotic Behavior of Solutions
- 5.5. Higher Order Linear Dynamic Equations
- 5.6. Notes and References
- Chapter 6. Dynamic Inequalities
- 6.1. Gronwall's Inequality
- 6.2. Hölder's and Minkowski's Inequalities
- 6.3. Jensen's Inequality
- 6.4. Opial Inequalities
- 6.5. Lyapunov Inequalities
- 6.6. Upper and Lower Solutions
- 6.7. Notes and References
- Chapter 7. Linear Symplectic Dynamic Systems
- 7.1. Symplectic Systems and Special Cases
- 7.2. Conjoined Bases
- 7.3. Transformation Theory and Trigonometric Systems
- 7.4. Notes and References
- Chapter 8. Extensions
- 8.1. Measure Chains
- 8.2. Nonlinear Theory
- 8.3. Alpha Derivatives
- 8.4. Nabla Derivatives
- 8.5. Notes and References
- Solutions to Selected Problems
- Bibliography
- Index
