Advances in dual integral equations
Author(s)
Bibliographic Information
Advances in dual integral equations
(Research notes in mathematics, 400)
Chapman and Hall/CRC, c1999
- : pbk
Available at / 42 libraries
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
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Hokkaido University, Library, Graduate School of Science, Faculty of Science and School of Science図書
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Note
Includes bibliographical references (p. 216-223) and index
Description and Table of Contents
Description
The effectiveness of dual integral equations for handling mixed boundary value problems has established them as an important tool for applied mathematicians. Their many applications in mathematical physics have prompted extensive research over the last 25 years, and many researchers have made significant contributions to the methodology of solving and to the applications of dual integral equations. However, until now, much of this work has been available only in the form of research papers scattered throughout different journals.
In Advances in Dual Integral Equations, the authors systematically present some of the recent developments in dual integral equations involving various special functions as kernel. They examine dual integral equations with Bessel, Legendre, and trigonometric functions as kernel plus dual integral equations involving inverse Mellin transforms. These can be particularly useful in studying certain mixed boundary value problems involving homogeneous media in continuum mechanics. However, when dealing with problems involving non-homogenous media, the corresponding equations may have different kernels. This application prompts the authors to conclude with a discussion of hybrid dual integral equations-mixed kernels with generalized associated Legendre functions and mixed kernels involving Bessel functions.
Researchers in the theory of elasticity, fluid dynamics, and mathematical physics will find Advances in Dual Integral Equations a concise, one-stop resource for recent work addressing special functions as kernel.
Table of Contents
Introduction
An Overview of Dual Integral Equations
Two Special Methods for Solving Some Classes of Dual Integral Equations
Dual Integral Equations with Bessel Function Kernel
Kernels Involving a Bessel Function of the First Kind
Kernels Involving a Bessel Function of the Second Kind
Dual Integral Equations Related to the Kontorovich-Levedev Transform
Dual Integral Equations Associated with Inverse Weber-Orr Transforms
Dual Integral Equations with Spherical Harmonic Kernel
Kernels Involving Legendre Functions
Kernels Involving Associated Legendre Functions
Kernels Involving Generalized Associated Legendre Functions
Dual Integral Equations with Trigonometric Function Kernel
Some Elementary Methods
Solutions by Using the Generalized Mehler-Fock Inversion Theorem
Solutions by Using the Generalized Associated Mehler-Fock Inversion Theorem
Dual Integral Equations Involving Inverse Mellin Transforms
Hybrid Dual Integral Equations
Mixed Kernels with Generalized Associated Legendre Functions
Mixed Kernels Involving Bessel Functions
Appendix: Useful Results of some Special Functions
Bessel Functions
Legendre and Associated Legendre Functions
Generalized Associated Legendre Functions
Bibliography
Index
by "Nielsen BookData"