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Title: |
A Closer Look at Boundary Value Problems |
Search Result:
| Edited by: |
Mustafa Avci |
| ISBN10-13: |
1536178578 : 9781536178579 |
| Format: |
Hardback |
| Pages: |
290 |
| Weight: |
.528 Kg. |
| Published: |
Nova Science Publishers, Inc - July 2020 |
| List Price: |
172.99 Pounds Sterling |
| Availability: |
In Stock
Qty Available: 5 |
| Subjects: |
Differential calculus & equations |
| Many problems encountered in applied mathematics or mathematical physics can be modelled by using differential equations under different boundary conditions. In this regard, linear and nonlinear partial differential equations are often used because of their strong capacity to describe and formulate many real-world problems governed by dynamical phenomena. There are many different methods to solve linear and nonlinear problems arising from different studies in various disciplines. However, due to lack of general existence theorems for establishing solutions, scientists have to seek alternative approaches and methods. In this context, the present work demonstrates different methods and approaches to obtain solutions to some class of differential equations given under different boundary conditions. The present book, where contemporary developments in the area of boundary value problems is shared, can be beneficial to advanced undergraduates, graduate students and researchers who are interested in the area of differential equations. |
| Table of Contents: |
| Preface; Boundary Value Problem of CO2 Production and Transport in Forest Sandy Soil; Boundary Value Problem of Hydrogen Thermal Desorption: Reduction to Fractional Differential Equation; Exact Absorbing Conditions for Initial Boundary Value Problems of Computational Electrodynamics: A Review; Diffraction Boundary Value Problems for Electromagnetic Theory of Inhomogeneous Multilayered Media: Riccati Equation Method; The Linearization Methods as a Basis to Derive the Relaxation and the Shooting Methods; The Existence of Boundary Value Problems of Fifth Painlevè Equation in a Complex Domain; Existence of Solutions for a Steklov Problem with Variable Exponent; On a Class of Kirchhoff Type Problems Involving Critical Exponents and Caffarelli-Kohn-Nirenberg Inequalities; Index. |
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