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A boundary spectral method for elast...

Sadraie, Hamid Reza.

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A boundary spectral method for elasticity problems with spherical inhomogeneities.

Record Type:	Language materials, printed : Monograph/item
Title/Author:	A boundary spectral method for elasticity problems with spherical inhomogeneities./
Author:	Sadraie, Hamid Reza.
Description:	79 p.
Notes:	Advisers: Steven L. Crouch; Sofia G. Mogilevskaya.
Contained By:	Dissertation Abstracts International67-07B.
Subject:	Applied Mechanics. -
Online resource:	http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=3225769
ISBN:	9780542794124

A boundary spectral method for elasticity problems with spherical inhomogeneities.
Sadraie, Hamid Reza.

A boundary spectral method for elasticity problems with spherical inhomogeneities. - 79 p.

Advisers: Steven L. Crouch; Sofia G. Mogilevskaya.

Thesis (Ph.D.)--University of Minnesota, 2006.

The problem of an infinite solid containing an arbitrary number of non-overlapping spherical cavities and inclusions with arbitrary sizes and locations is considered. The infinite solid and the spherical inclusions are made of different isotropic, linearly elastic materials. The spherical cavities are assumed to carry arbitrary tractions, and the spherical inclusions are assumed to be perfectly bonded to the infinite solid. The boundary and interfacial displacements and tractions are represented by truncated series of surface spherical harmonics. The problem involving multiple spherical features is replaced by a sequence of problems involving a single spherical feature via Schwarz's alternating method, which accounts for the interactions in the course of an iterative process. Problems involving a single spherical feature are solved by employing the Papkovich-Neuber functions, and the interactions are evaluated by applying a least squares method. A robust scheme is introduced to control the total errors on the spherical boundaries and interfaces and to choose the number of terms in the series expansions. Several numerical examples are given to address the efficiency and the accuracy of the boundary spectral method.

ISBN: 9780542794124Subjects--Topical Terms:

1018410
Applied Mechanics.

A boundary spectral method for elasticity problems with spherical inhomogeneities.
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020 $a 9780542794124
035 $a (UMI)AAI3225769
035 $a AAI3225769
040 $a UMI $c UMI
100 1 $a Sadraie, Hamid Reza. $3 1293427
245 1 2 $a A boundary spectral method for elasticity problems with spherical inhomogeneities.
300 $a 79 p.
500 $a Advisers: Steven L. Crouch; Sofia G. Mogilevskaya.
500 $a Source: Dissertation Abstracts International, Volume: 67-07, Section: B, page: 3974.
502 $a Thesis (Ph.D.)--University of Minnesota, 2006.
520 $a The problem of an infinite solid containing an arbitrary number of non-overlapping spherical cavities and inclusions with arbitrary sizes and locations is considered. The infinite solid and the spherical inclusions are made of different isotropic, linearly elastic materials. The spherical cavities are assumed to carry arbitrary tractions, and the spherical inclusions are assumed to be perfectly bonded to the infinite solid. The boundary and interfacial displacements and tractions are represented by truncated series of surface spherical harmonics. The problem involving multiple spherical features is replaced by a sequence of problems involving a single spherical feature via Schwarz's alternating method, which accounts for the interactions in the course of an iterative process. Problems involving a single spherical feature are solved by employing the Papkovich-Neuber functions, and the interactions are evaluated by applying a least squares method. A robust scheme is introduced to control the total errors on the spherical boundaries and interfaces and to choose the number of terms in the series expansions. Several numerical examples are given to address the efficiency and the accuracy of the boundary spectral method.
590 $a School code: 0130.
650 4 $a Applied Mechanics. $3 1018410
650 4 $a Engineering, Civil. $3 783781
690 $a 0346
690 $a 0543
710 2 0 $a University of Minnesota. $3 676231
773 0 $t Dissertation Abstracts International $g 67-07B.
790 $a 0130
790 1 0 $a Crouch, Steven L., $e advisor
790 1 0 $a Mogilevskaya, Sofia G., $e advisor
791 $a Ph.D.
792 $a 2006
856 4 0 $u http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=3225769