Finite Element Methods for Eigenvalue Problems
2nd Edition
Published on 10. May 2026
Book
Hardback
358 pages
978-1-032-98302-8 (ISBN)
Description
Praise for the previous edition
"I highly recommend the book, especially for the curious graduate student."
-Joe Coyle, Mathematical Reviews
Finite Element Methods for Eigenvalue Problems covers finite element methods for several typical eigenvalues that arise from science and engineering. Both theory and implementation are covered in depth at the graduate level. The background for typical eigenvalue problems is included along with functional analysis tools, finite element discretization methods, convergence analysis, techniques for matrix evaluation problems, and computer implementation. The book also presents new methods, such as the discontinuous Galerkin method, and new problems, such as the transmission eigenvalue problem.
New to the second edition
? Two brand new chapters
? Copious revisions of existing chapters
? Revised references throughout.
"I highly recommend the book, especially for the curious graduate student."
-Joe Coyle, Mathematical Reviews
Finite Element Methods for Eigenvalue Problems covers finite element methods for several typical eigenvalues that arise from science and engineering. Both theory and implementation are covered in depth at the graduate level. The background for typical eigenvalue problems is included along with functional analysis tools, finite element discretization methods, convergence analysis, techniques for matrix evaluation problems, and computer implementation. The book also presents new methods, such as the discontinuous Galerkin method, and new problems, such as the transmission eigenvalue problem.
New to the second edition
? Two brand new chapters
? Copious revisions of existing chapters
? Revised references throughout.
More details
Series
Edition
2nd edition
Language
English
Place of publication
United Kingdom
Publishing group
Taylor & Francis Ltd
Target group
College/higher education
Postgraduate
Illustrations
60 s/w Abbildungen, 60 s/w Zeichnungen, 86 s/w Tabellen
86 Tables, black and white; 60 Line drawings, black and white; 60 Illustrations, black and white
Dimensions
Height: 254 mm
Width: 178 mm
Weight
850 gr
ISBN-13
978-1-032-98302-8 (9781032983028)
Copyright in bibliographic data and cover images is held by Nielsen Book Services Limited or by the publishers or by their respective licensors: all rights reserved.
Schweitzer Classification
Other editions
Additional editions
Jiguang Sun | Aihui Zhou
Finite Element Methods for Eigenvalue Problems
E-Book
05/2026
2nd Edition
Chapman and Hall
€218.99
Available for download
Jiguang Sun | Aihui Zhou
Finite Element Methods for Eigenvalue Problems
E-Book
05/2026
2nd Edition
Chapman and Hall
€218.99
Available for download
Previous edition
Jiguang Sun | Aihui Zhou
Finite Element Methods for Eigenvalue Problems
Book
07/2016
1st Edition
Chapman & Hall/CRC
€252.55
Article not available for order
Persons
Jiguang Sun is the Richard and Elizabeth Henes Endowed Professor of Mathematics at Michigan Technological University. He received his B.S. from Tsinghua University in 1996 and his Ph.D. from the University of Delaware in 2005. His research interests include numerical analysis, computational methods for eigenvalue problems, and inverse scattering theory.
Aihui Zhou is a professor at the Academy of Mathematics and Systems Science of the Chinese Academy of Sciences. He received his Ph.D. from the Institute of Systems Science of the Chinese Academy of Sciences in 1991. His research focuses on mathematical understanding and numerical approximation of electronic structure models and related topics.
Aihui Zhou is a professor at the Academy of Mathematics and Systems Science of the Chinese Academy of Sciences. He received his Ph.D. from the Institute of Systems Science of the Chinese Academy of Sciences in 1991. His research focuses on mathematical understanding and numerical approximation of electronic structure models and related topics.
Content
1 Functional Analysis . 2 Finite Elements . 3 Laplace Eigenvalue Problem . 4 Biharmonic Eigenvalue Problem . 5 Maxwell Eigenvalue Problem . 6 Quad-curl Eigenvalue Problem . 7 Transmission Eigenvalue Problem . 8 Schroedinger Eigenvalue Problem . 9 Adaptive Finite Element Approximations . 10 Scattering Resonances. 11 Matrix Eigenvalue Problems. 12 Contour Integral Based Eigensolvers.