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Inverse problems in engineering mechanics : International Symposium on Inverse Problems in Engineering Mechanics 1998 (ISIP '98), Nagano, Japan /

Inverse problems can be found in many topics of engineering mechanics. There are many successful applications in the fields of inverse problems (non-destructive testing and characterization of material properties by ultrasonic or X-ray techniques, thermography, etc.). Generally speaking, the inverse...

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Bibliographic Details
Corporate Authors: International Symposium on Inverse Problems Nagano-shi, Japan; Elsevier Science & Technology
Group Author: Tanaka, M. Masataka, 1943; Dulikravich, George S
Published: Elsevier,
Publisher Address: Amsterdam ; New York :
Publication Dates: 1998.
Literature type: eBook
Language: English
Subjects:
Mechanics, Applied > Congresses
Inverse problems Differential equations > Congresses
TECHNOLOGY & ENGINEERING > Material Science
Inverse problems Differential equations
Mechanics, Applied
Me canique applique e > Congre s
Proble mes inverses e quations diffe rentielles > Congre s
Electronic books
Conference papers and proceedings
Online Access: http://www.sciencedirect.com/science/book/9780080433196
Summary: Inverse problems can be found in many topics of engineering mechanics. There are many successful applications in the fields of inverse problems (non-destructive testing and characterization of material properties by ultrasonic or X-ray techniques, thermography, etc.). Generally speaking, the inverse problems are concerned with the determination of the input and the characteristics of a mechanical system from some of the output from the system. Mathematically, such problems are ill-posed and have to be overcome through development of new computational schemes, regularization techniques, objec
Carrier Form: 1 online resource (xii, 622 pages) : illustrations
Bibliography: Includes bibliographical references and index.
ISBN: 9780080433196
0080433197
9780080535166
008053516X
Index Number: TA349
CLC: TB12
Contents: Chapter headings and selected papers: Inverse Heat Conduction. Spectral and wavelet methods for solving an inverse heat conduction problem (L. Eld n, F. Berntsson). Boundary Data Detection in Elasticity. A finite element formulation for the detection of boundary conditions in elasticity and heat conduction (B.H. Dennis, G.S. Dulikravich). Crack and Defect Detection. Determination of crack location from changes in natural frequencies (M. Tanaka, A.N. Bercin). Shape Detection. Identification of unknown boundary shape of rotationally symmetric body in steady heat conduction via BEM and filter t

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