Natural Boundary Integral Method and Its Applications 2002 Edition Contributor(s): De-Hao Yu (Author) |
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ISBN: 1402004575 ISBN-13: 9781402004575 Publisher: Springer OUR PRICE: $161.49 Product Type: Hardcover - Other Formats Published: September 2002 Annotation: Boundary element methods are very important for solving boundary value problems in PDEs. Many boundary value problems of partial differential equations can be reduced into boundary integral equations by the natural boundary reduction. In this book the natural boundary integral method, suggested and developed by Feng and Yu, is introduced systematically. It is quite different from popular boundary element methods and has many distinctive advantages. The variational principle is conserved after the natural boundary reduction, and some useful properties are also preserved faithfully. Moreover, it can be applied directly and naturally in the coupling method and the domain decomposition method of finite and boundary elements. Most of the material in this book has only appeared in the author's previous papers. Compared with its Chinese edition (Science Press, Beijing, 1993), many new research results such as the domain decomposition methods based on the natural boundary reduction are added. |
Additional Information |
BISAC Categories: - Technology & Engineering | Engineering (general) - Mathematics | Differential Equations - General - Medical |
Dewey: 515.35 |
LCCN: 2003268041 |
Series: Mathematics and Its Applications |
Physical Information: 1.3" H x 6.38" W x 9.92" (2.24 lbs) 540 pages |
Descriptions, Reviews, Etc. |
Publisher Description: Boundary element methods are very important for solving boundary value problems in PDEs. Many boundary value problems of partial differential equations can be reduced into boundary integral equations by the natural boundary reduction. In this book the natural boundary integral method, suggested and developed by Feng and Yu, is introduced systematically. It is quite different from popular boundary element methods and has many distinctive advantages. The variational principle is conserved after the natural boundary reduction, and some useful properties are also preserved faithfully. Moreover, it can be applied directly and naturally in the coupling method and the domain decomposition method of finite and boundary elements. Most of the material in this book has only appeared in the author's previous papers. Compared with its Chinese edition (Science Press, Beijing, 1993), many new research results such as the domain decomposition methods based on the natural boundary reduction are added. |