Textbook on Ordinary Differential Equations: A Theoretical Approach
Many scientific and real-world problems that occur in science, engineering, and medicine can be represented in differential equations. There is a vital role for differential equations in studying the behavior of different types of real-world problems. Thus, it becomes crucial to know the existence and uniqueness properties of differential equations and various methods of finding differential equation solutions in explicit form. It is also essential to know different kinds of differential equations in terms of eigenvalues, termed eigenvalue problems, and some special functions used in finding the solution to differential equations. The study of nonlinear problems also plays a significant role in different real-world'situations. There is a necessity to know the behavior of solutions of nonlinear differential equations. Still, there are very few forms of differential equations whose solution can be found in explicit form. For the differential equations whose solutions cannot be found in explicit form, one has to study the properties of solutions of the given differential equation to guess an approximate solution of it. This book aims to introduce all the necessary topics of differential equations in one book so that laymen can easily understand the subject and apply it in their research areas. The novel approach used in this book is the introduction of different analytical methods for finding the solution of differential equations with sufficient theorems, corollaries, and examples, and the geometrical interpretations in each topic.

This textbook is intended to study the theory and methods of finding the explicit solutions to differential equations, wherever possible, and in the absence of finding explicit solutions, it is intended to study the properties of solutions to the given differential equations. This book is based on syllabi of the theory of differential equations prescribed for postgraduate students of mathematics and applied mathematics in different institutions and universities of India and abroad. This book will be helpful for competitive examinations as well.

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Textbook on Ordinary Differential Equations: A Theoretical Approach
Many scientific and real-world problems that occur in science, engineering, and medicine can be represented in differential equations. There is a vital role for differential equations in studying the behavior of different types of real-world problems. Thus, it becomes crucial to know the existence and uniqueness properties of differential equations and various methods of finding differential equation solutions in explicit form. It is also essential to know different kinds of differential equations in terms of eigenvalues, termed eigenvalue problems, and some special functions used in finding the solution to differential equations. The study of nonlinear problems also plays a significant role in different real-world'situations. There is a necessity to know the behavior of solutions of nonlinear differential equations. Still, there are very few forms of differential equations whose solution can be found in explicit form. For the differential equations whose solutions cannot be found in explicit form, one has to study the properties of solutions of the given differential equation to guess an approximate solution of it. This book aims to introduce all the necessary topics of differential equations in one book so that laymen can easily understand the subject and apply it in their research areas. The novel approach used in this book is the introduction of different analytical methods for finding the solution of differential equations with sufficient theorems, corollaries, and examples, and the geometrical interpretations in each topic.

This textbook is intended to study the theory and methods of finding the explicit solutions to differential equations, wherever possible, and in the absence of finding explicit solutions, it is intended to study the properties of solutions to the given differential equations. This book is based on syllabi of the theory of differential equations prescribed for postgraduate students of mathematics and applied mathematics in different institutions and universities of India and abroad. This book will be helpful for competitive examinations as well.

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Textbook on Ordinary Differential Equations: A Theoretical Approach

Textbook on Ordinary Differential Equations: A Theoretical Approach

by Ramakanta Meher
Textbook on Ordinary Differential Equations: A Theoretical Approach

Textbook on Ordinary Differential Equations: A Theoretical Approach

by Ramakanta Meher

Hardcover

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Overview

Many scientific and real-world problems that occur in science, engineering, and medicine can be represented in differential equations. There is a vital role for differential equations in studying the behavior of different types of real-world problems. Thus, it becomes crucial to know the existence and uniqueness properties of differential equations and various methods of finding differential equation solutions in explicit form. It is also essential to know different kinds of differential equations in terms of eigenvalues, termed eigenvalue problems, and some special functions used in finding the solution to differential equations. The study of nonlinear problems also plays a significant role in different real-world'situations. There is a necessity to know the behavior of solutions of nonlinear differential equations. Still, there are very few forms of differential equations whose solution can be found in explicit form. For the differential equations whose solutions cannot be found in explicit form, one has to study the properties of solutions of the given differential equation to guess an approximate solution of it. This book aims to introduce all the necessary topics of differential equations in one book so that laymen can easily understand the subject and apply it in their research areas. The novel approach used in this book is the introduction of different analytical methods for finding the solution of differential equations with sufficient theorems, corollaries, and examples, and the geometrical interpretations in each topic.

This textbook is intended to study the theory and methods of finding the explicit solutions to differential equations, wherever possible, and in the absence of finding explicit solutions, it is intended to study the properties of solutions to the given differential equations. This book is based on syllabi of the theory of differential equations prescribed for postgraduate students of mathematics and applied mathematics in different institutions and universities of India and abroad. This book will be helpful for competitive examinations as well.


Product Details

ISBN-13: 9788770227636
Publisher: River Publishers
Publication date: 12/29/2022
Pages: 290
Product dimensions: 6.12(w) x 9.19(h) x (d)

About the Author

Professor Ramakanta Meher, a leading researcher and author, works at the Department of Mathematics, Sardar Vallabhbhai National Institute of Technology, Surat, Gujarat, India. He has authored six leading textbooks on Mathematics and published around 60 research publications in various reputed indexed international journals. Professor Meher has a combined career and research experience of more than 16 years. Fluid dynamics, linear algebra, differential and integral equations, and fractional differential equations are some of his research interests. He has supervised around 24 master's students and six doctoral students. He has coordinated over ten short term training/faculty development programs, and he has given over 20 invited speeches at several notable institutions. He is a member of several prestigious societies and a reviewer of more than 20 international journals.

Table of Contents

1. Basic Concepts of Differential Equations 2. Uniform Convergence 3. Existence and Uniqueness Theory 4. Nonlocal Existence Theorem 5. System of First-Order Differential Equations 6. Non-Homogenous Linear Systems 7. Boundary Value Problems 8. Green’s Function and Sturm Theory 9. Sturm Theory 10. The Nonlinear Theory 11. Linearization 12. Analytical and Numerical Methods for Differential Equations

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