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Table of Contents
Intro
Preface
Contents
About the Authors
Part I Integral Equations
1 Integral Equations: An Introduction
1.1 Introduction
1.1.1 What is an Integral Equation?
1.1.2 Classifications of Integral Equations
1.2 Occurrence of Integral Equations
1.2.1 Occurrence of Volterra Integral Equations
1.2.2 Occurrence of Fredholm Integral Equations
References
2 Fredholm Integral Equation of the Second Kind with Degenerate Kernel
2.1 Integral Equation with Degenerate Kernel
2.2 Homogeneous Equations
2.3 Nonhomogeneous Equations
References
3 Integral Equations of Second Kind with Continuous and Square Integrable Kernel
3.1 Fredholm Integral Equations of Second Kind with Continuous Kernel
3.2 Volterra Integral Equations of Second Kind with Continuous Kernel
3.3 Illustrative Examples
3.4 Iterated Kernels
3.5 Fredholm Theory for Integral Equation with Continuous Kernel
3.6 Fredholm Integral Equations of Second Kind with Square Integrable Kernel
3.6.1 Some Important Properties of Square Integrable Functions
3.6.2 Method of Solution of Integral Equation with Square Integrable Kernel
3.7 Fredholm Theory for Integral Equation with Square Integrable Kernel
References
4 Integral Equations of the Second Kind with a Symmetric Kernel
4.1 Symmetric Kernel
4.2 Properties of Integral Equations with a Symmetric Kernel
4.3 Hilbert-Schmidt Theorem
References
5 Abel Integral Equations
5.1 Solution Based on Elementary Integration
5.2 Solution Based on Laplace Transform
References
Part II Integral Transform
6 Fourier Transform
6.1 Integral Transform: An Introduction
6.2 Fourier Integral Theorem
6.3 Rigorous Justification of Fourier Integral Theorem
6.4 Fourier Cosine and Sine Transforms
6.5 Fourier Transforms of Some Simple Functions
6.6 Properties of Fourier Transform
6.7 Convolution Theorem and Parseval Relation
6.8 Fourier Transforms in Two or More Dimensions
6.9 Application of Fourier Transforms in Solving Linear Ordinary ...
6.10 Application of Fourier Sine and Cosine Transforms in Solving ...
6.11 Application to Partial Differential Equations
6.12 Application of Fourier Sine and Cosine Transform to the Solution ...
References
7 Laplace Transform
7.1 Derivation of Laplace Transform from Fourier Integral Theorem
7.2 Laplace Inversion
7.3 Operational Properties of Laplace Transform
7.4 Laplace Convolution Integral
7.5 Tauberian Theorems
7.6 Method of Evaluation of Inverse Laplace Transform
7.7 Application of Laplace Transform in Solving Ordinary Differential Equations
7.8 Application Laplace Transform in Solving Partial Differential Equations
References
8 Mellin Transform
8.1 Introduction
8.2 Formal Derivation of Mellin Transform
8.3 Theorem on Inversion of Mellin Transform
Preface
Contents
About the Authors
Part I Integral Equations
1 Integral Equations: An Introduction
1.1 Introduction
1.1.1 What is an Integral Equation?
1.1.2 Classifications of Integral Equations
1.2 Occurrence of Integral Equations
1.2.1 Occurrence of Volterra Integral Equations
1.2.2 Occurrence of Fredholm Integral Equations
References
2 Fredholm Integral Equation of the Second Kind with Degenerate Kernel
2.1 Integral Equation with Degenerate Kernel
2.2 Homogeneous Equations
2.3 Nonhomogeneous Equations
References
3 Integral Equations of Second Kind with Continuous and Square Integrable Kernel
3.1 Fredholm Integral Equations of Second Kind with Continuous Kernel
3.2 Volterra Integral Equations of Second Kind with Continuous Kernel
3.3 Illustrative Examples
3.4 Iterated Kernels
3.5 Fredholm Theory for Integral Equation with Continuous Kernel
3.6 Fredholm Integral Equations of Second Kind with Square Integrable Kernel
3.6.1 Some Important Properties of Square Integrable Functions
3.6.2 Method of Solution of Integral Equation with Square Integrable Kernel
3.7 Fredholm Theory for Integral Equation with Square Integrable Kernel
References
4 Integral Equations of the Second Kind with a Symmetric Kernel
4.1 Symmetric Kernel
4.2 Properties of Integral Equations with a Symmetric Kernel
4.3 Hilbert-Schmidt Theorem
References
5 Abel Integral Equations
5.1 Solution Based on Elementary Integration
5.2 Solution Based on Laplace Transform
References
Part II Integral Transform
6 Fourier Transform
6.1 Integral Transform: An Introduction
6.2 Fourier Integral Theorem
6.3 Rigorous Justification of Fourier Integral Theorem
6.4 Fourier Cosine and Sine Transforms
6.5 Fourier Transforms of Some Simple Functions
6.6 Properties of Fourier Transform
6.7 Convolution Theorem and Parseval Relation
6.8 Fourier Transforms in Two or More Dimensions
6.9 Application of Fourier Transforms in Solving Linear Ordinary ...
6.10 Application of Fourier Sine and Cosine Transforms in Solving ...
6.11 Application to Partial Differential Equations
6.12 Application of Fourier Sine and Cosine Transform to the Solution ...
References
7 Laplace Transform
7.1 Derivation of Laplace Transform from Fourier Integral Theorem
7.2 Laplace Inversion
7.3 Operational Properties of Laplace Transform
7.4 Laplace Convolution Integral
7.5 Tauberian Theorems
7.6 Method of Evaluation of Inverse Laplace Transform
7.7 Application of Laplace Transform in Solving Ordinary Differential Equations
7.8 Application Laplace Transform in Solving Partial Differential Equations
References
8 Mellin Transform
8.1 Introduction
8.2 Formal Derivation of Mellin Transform
8.3 Theorem on Inversion of Mellin Transform