Author(s): William F. Trench
Series: FANTOMASPING
Edition: 1
Publisher: Trinity University
Year: 2012
Language: English
Pages: 808
City: San Antonio, Texas, USA
Tags: Differential Equations
Elementary Differential Equations with Boundary Value Problems
Recommended Citation
Table of Contents
Preface
Chapter 1 Introduction
Section 1.1 Some Applications Leading to Differential Equations
Section 1.2 Basic Concepts
Section 1.3 Direction Fields for First Order Equations
Chapter 2 First Order Equations
Section 2.1 Linear First Order Equations
Section 2.2 Separable Equations
Section 2.3 Existence and Uniqueness of Solutions of Nonlinear Equations
Section 2.4 Transformation of Nonlinear Equations into Separable Equations
Section 2.5 Exact Equations
Section 2.6 Exact Equations
Chapter 3 Numerical Methods
Section 3.1 Euler's Method
Section 3.2 The Improved Euler Method and Related Methods
Section 3.3 The Runge-Kutta Method
Chapter 4 Applications of First Order Equations
Section 4.1 Growth and Decay
Section 4.2 Cooling and Mixing
Section 4.3 Elementary Mechanics
Section 4.4 Autonomous Second Order Equations
Section 4.5 Applications to Curves
Chapter 5 Linear Second Order Equations
Section 5.1 Homogeneous Linear Equations
Section 5.2 Constant Coefficient Homogeneous Equations
Section 5.3 Nonhomogeneous Linear Equations
Section 5.4 The Method of Undetermined Coefficients I
Section 5.5 The Method of Undetermined Coefficients II
Section 5.6 Reduction of Order
Section 5.7 Variation of Parameters
Chapter 6 Applications of Linear Second Order Equations
Section 6.1 Spring Problems I
Section 6.2 Spring Problems II
Section 6.3 The RLC Circuit
Section 6.4 Motion Under a Central Force
Chapter 7 Series Solutions of Linear Second Equations
Section 7.1 Review of Power Series
Section 7.2 Series Solutions Near an Ordinary Point I
Section 7.3 Series Solutions Near an Ordinary Point II
Section 7.4 Regular Singular Points Euler Equations
Section 7.5 The Method of Frobenius I
Section 7.6 The Method of Frobenius II
Section 7.7 The Method of Frobenius III
Chapter 8 Laplace Transforms
Section 8.1 Introduction to the Laplace Transform
Section 8.2 The Inverse Laplace Transform
Section 8.3 Solution of Initial Value Problems
Section 8.4 The Unit Step Function
Section 8.5 Constant Coeefficient Equations with Piecewise Continuous Forcing Functions
Section 8.6 Convolution
Section 8.7 Constant Coefficient Equations with Impulses
8.8 A Brief Table of Laplace Transforms
Chapter 9 Linear Higher Order Equations
Section 9.1 Introduction to Linear Higher Order Equations
Section 9.2 Higher Order Constant Coefficient Homogeneous Equations
Section 9.3 Undetermined Coefficients for Higher Order Equations
Section 9.4 Variation of Parameters for Higher Order Equations
Chapter 10 Linear Systems of Differential Equations
Section 10.1 Introduction to Systems of Differential Equations
Section 10.2 Linear Systems of Differential Equations
Section 10.3 Basic Theory of Homogeneous Linear System
Section 10.4 Constant Coefficient Homogeneous Systems I
Section 10.5 Constant Coefficient Homogeneous Systems II
Section 10.6 Constant Coefficient Homogeneous Systems III
Section 10.7 Variation of Parameters for Nonhomogeneous Linear Systems
Chapter 11 Boundary Value Problems and Fourier Expansions
Section 11.1 Eigenvalue Problems
Section 11.2 Fourier Expansions I
Section 11.3 Fourier Expansions II
Chapter 12 Fourier Solutions of Partial Differential
Section 12.1 The Heat Equation
Section 12.2 The Wave Equation
Section 12.3 Laplace's Equation in Rectangular Coordinates
Section 12.4 Laplace's Equation in Polar Coordinates
Chapter 13 Boundary Value Problems for Second Order Ordinary Differential Equations
Section 13.1 Two-Point Boundary Value Problems
Section 13.2 Sturm-Liouville Problems
A Brief Table of Integrals
Answers to Selected
Index
