Inverse Problems and Related Topics
1st Edition
Published on 7. June 2019
Book
Hardback
244 pages
978-1-138-40408-3 (ISBN)
Description
Inverse problems arise in many disciplines and hold great importance to practical applications. However, sound new methods are needed to solve these problems. Over the past few years, Japanese and Korean mathematicians have obtained a number of very interesting and unique results in inverse problems.
Inverse Problems and Related Topics compiles papers authored by some of the top researchers in Korea and Japan. It presents a number of original and useful results and offers a unique opportunity to explore the current trends of research in inverse problems in these countries. Highlighting the existence and active work of several Japanese and Korean groups, it also serves as a guide to those seeking future scientific exchange with researchers in these countries.
Inverse Problems and Related Topics compiles papers authored by some of the top researchers in Korea and Japan. It presents a number of original and useful results and offers a unique opportunity to explore the current trends of research in inverse problems in these countries. Highlighting the existence and active work of several Japanese and Korean groups, it also serves as a guide to those seeking future scientific exchange with researchers in these countries.
Reviews / Votes
"The aim of this book is to fill the gap between high-school mathematics and mathematics taught at university...the reader is shown what it means to prove something rigourously...This book is easy to read for anyone with a high-school mathematics background."- European Mathematical Society Newsletter
More details
Series
Language
English
Place of publication
London
United Kingdom
Publishing group
Taylor & Francis Ltd
Target group
Professional and scholarly
Professional
Dimensions
Height: 234 mm
Width: 156 mm
Weight
610 gr
ISBN-13
978-1-138-40408-3 (9781138404083)
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
Gen Nakamura | Saburou Saitoh | Jin Kean Seo
Inverse Problems and Related Topics
E-Book
05/2019
1st Edition
Chapman & Hall/CRC
€251.99
Available for download
Gen Nakamura | Saburou Saitoh | Jin Kean Seo
Inverse Problems and Related Topics
E-Book
05/2019
Chapman & Hall/CRC
€251.99
Available for download
Gen Nakamura | Saburou Saitoh | Jin Kean Seo
Inverse Problems and Related Topics
Book
02/2000
1st Edition
Chapman & Hall/CRC
€267.41
Shipment within 15-20 days
Persons
Gen Nakamura Common Chairs, Gunma University. Saburou Saitoh Department of Mathematics, Faculty of Engineering, Gunma University, Kiryu 376-8515, Japan. Jin Keun Seo Department of Mathematics, Yonsei University, Seoul 120-749, Korea. Masahiro Yamamoto Department of Mathematical Sciences, University of Tokyo, 3-8-1 Komaba Meguro 153 Tokyo Japan.
Content
Preface, 1. A finite difference model for Calderon's boundary inverse problem, 2. Inverse problems for equations with memory, 3. Parameter estimation of elastic media, 4. The probe method and its applications, 5. Recent progress in the inverse conductivity problem with single measurement, 6. A moment method on inverse problems for the heat equation, 7. Some remarks on free boundaries of recirculating Euler flows with constant vorticity, 8. Algorithms for the identification of spatially varying/invariant stiffness and dampings in flexible beams, 9. Numerical solutions of the Cauchy problem in potential and elastostatics, 10. Inverse source problems in the Helmholtz equation, 11. A numerical method for a magnetostatic inverse problem using the edge element, 12. Impedance computed tomo-electrocardiography, 13. An inverse problem for free channel scattering, 14. Surface impedance tensor and boundary value problem, 15. Asymptotics for the spectral and Weyl functions of the operator-valued Sturm-Liouville problem, 16. Exact controllability method and multidimensional linear inverse problems