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Differential Equations A Linear Algebra Approach 1st Edition by Anindya Dey ISBN 1032072261 ‎ 978-1032072265

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Differential Equations: A Linear Algebra Approach 1st Edition Anindya Dey Digital Instant Download

Author(s): Anindya Dey
ISBN(s): 9781032072265, 1032072261
Edition: 1
File Details: PDF, 5.25 MB
Year: 2021
Language: English
Sell by: Brandon Rivera
SKU: EB-34022282 Category: Tag:

Differential Equations: A Linear Algebra Approach 1st Edition by Anindya Dey – Ebook PDF Instant Download/Delivery:1032072261 ,‎ 978-1032072265
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ISBN 10: 1032072261
ISBN 13: ‎ 978-1032072265
Author: Anindya Dey

Differential Equations: A Linear Algebra Approach follows an innovative approach of inculcating linear algebra and elementary functional analysis in the backdrop of even the simple methods of solving ordinary differential equations. The contents of the book have been made user-friendly through concise useful theoretical discussions and numerous illustrative examples practical and pathological.

Differential Equations: A Linear Algebra Approach 1st Table of contents:

1 A Prelude to Differential Equations

1.1 Introduction

1.2 Formulation of Differential Equation–Its Significance.

1.3 Classification of Solutions: General, Particular and Singular Solutions

1.4 More about Solutions of an ODE

1.5 Existence-Uniqueness Theorem for Cauchy Problem.

1.6 Importance of Lipschitz’s condition involved in existence uniqueness theorem in the light of a comparative study between Radiactive decay and Leaky bucket problems:

1.7 First Order Ode and some of its Qualitative Aspects

2 Equations of First Order and First Degree

2.1 Introduction

2.2 Exact Differential Equation

2.3 Homogeneous Differential Equations

2.4 Integrating Factor

2.5 Linear Equations and Bernoulli Equations

2.6 Integrating Factors Revisited

2.7 Riccati Equation

2.8 Application of Differential Equations of First Order

2.9 Orthogonal Trajectories and Oblique Trajectories

3 A Class of First Order Non-Linear Odes

3.1 Introduction

3.2 Non-linear First Order Ode Solvable for p

3.3 Non-linear Ode Solvable for y

3.4 Non-linear Ode Solvable for x

3.5 Existence and Uniqueness Problem

3.6 Envelopes and Other Loci

3.7 Clairaut’s Equation and Lagrange’s Equation

4 Linear Algebraic Framework in Differential Equations

4.1 Introduction

4.2 Linear Spaces

4.3 LinearMaps or Transformations

4.4 Normed Linear Space

4.5 Bounded Linear Transformation

4.6 Invertible Operators

5 Differential Equations of Higher Order

5.1 Introduction

5.2 Theoretical Aspects

5.3 Wronskian

5.4 Working Rules for Homogeneous Linear Ode

5.5 Few Theoretical Results from Linear Algebra.

5.6 Symbolic Operator 1/L(D) and Particular Integral

5.7 Method of Variation of Parameters

5.8 Special Methods for finding Particular Integrals

5.9 Method of Undetermined Co-efficients

5.10 Fourier Series Method for Particular Integrals

6 Second Order Linear Ode: Solution Techniques & Qualitative Analysis

6.1 Introduction

6.2 Reduction of Order Method (D’Alembert’s Method)

6.3 Method of Inspection for finding one Integral

6.4 Transformation of Second Order Ode by changing the Independent Variable

6.5 Transformation of a Second order Ode by changing the Dependent Variable:

6.6 Qualitative Aspects of Second Order Differential Equations

6.7 Exact Second Order Differential Equations

6.8 Adjoint Equation and Self-adjoint Odes

6.9 Sturm-Liouville Problems

6.10 Green’s Function Approach to IVP

6.11 Green’s Function Approach to BVP

7 Laplace Transformations in Ordinary Differential Equations

7.1 Introduction

7.2 Definition and Anatomy of Laplace Transform

7.3 Laplace transformation technique of solving Ordinary Differential Equations

8 Series Solutions of Linear Differential Equations

8.1 Introduction

8.2 Review of Power Series

8.3 Solutions about Ordinary Points in the Domain

8.4 Solution about Regular Singular Points

8.5 FrobeniusMethod

8.6 Hypergeometric Equation

8.7 Irregular singular points

9 Solving Linear Systems by Matrix Methods

9.1 Introduction

9.2 Eigenvalue Problems of a square matrix: Diagonalisability

9.3 Solution of Vector Differential Equation using Eigenvalues of Associated Matrix

9.4 Operator Norm and Its use in defining Exponentials of Matrices

9.5 Generalised Eigenvectors: Solution to IVP

9.6 Jordanization of Matrices and Solution of Ode

9.7 Fundamental Matrix and Liouville Theorem

9.8 Alternative Ansatz for Computation of eAx

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