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contributor authorY. Shindo
date accessioned2017-05-08T23:14:50Z
date available2017-05-08T23:14:50Z
date copyrightMarch, 1983
date issued1983
identifier issn0021-8936
identifier otherJAMCAV-26214#50_1.pdf
identifier urihttp://yetl.yabesh.ir/yetl/handle/yetl/96707
description abstractThe problem of the diffraction of normally incident longitudinal waves on a Griffith crack located in an infinite soft ferromagnetic elastic solid is considered. It is assumed that the solid is a homogeneous and isotropic one and is permeated by a uniform magnetostatic field normal to the crack surfaces. Fourier transforms are used to reduce the problem to two simultaneous dual integral equations. The solution to the integral equations is expressed in terms of a Fredholm integral equation of the second kind having the kernel that is a finite integral. The dynamic singular stress field near the crack tip is obtained and the influence of the magnetic field on the dynamic stress intensity factor is shown graphically in detail. Approximate analytical expressions valid at low frequencies are also obtained and the range of validity of these expressions is examined.
publisherThe American Society of Mechanical Engineers (ASME)
titleDynamic Singular Stresses for a Griffith Crack in a Soft Ferromagnetic Elastic Solid Subjected to a Uniform Magnetic Field
typeJournal Paper
journal volume50
journal issue1
journal titleJournal of Applied Mechanics
identifier doi10.1115/1.3167016
journal fristpage50
journal lastpage56
identifier eissn1528-9036
keywordsMagnetic fields
keywordsStress
keywordsFracture (Materials)
keywordsIntegral equations
keywordsDiffraction
keywordsLongitudinal waves
keywordsFourier transforms
keywordsFredholm integral equations AND Frequency
treeJournal of Applied Mechanics:;1983:;volume( 050 ):;issue: 001
contenttypeFulltext


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