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TECHNICAL PAPERS

Transient Responses in a Piezoelectric Spherically Isotropic Hollow Sphere for Symmetric Problems

[+] Author and Article Information
H. J. Ding

Department of Civil Engineering, Zhejiang University, Hangzhou 310027, Peoples’ Republic of Chinae-mail: hjding@mail.hz.zj.cn

H. M. Wang

Department of Mechanics, Zhejiang University, Hangzhou 310027, Peoples’ Republic of China

W. Q. Chen

Department of Civil Engineering, Zhejiang University, Hangzhou 310027, Peoples’ Republic of China

J. Appl. Mech 70(3), 436-445 (Jun 11, 2003) (10 pages) doi:10.1115/1.1554415 History: Received January 30, 2002; Revised September 15, 2002; Online June 11, 2003
Copyright © 2003 by ASME
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References

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Figures

Grahic Jump Location
History of dynamic stress σr at ξ=0.75
Grahic Jump Location
History of dynamic stress σθ at ξ=0.5
Grahic Jump Location
Histories of dynamic electric displacement D at different locations
Grahic Jump Location
Distributions of dynamic electric potential ϕ at different times
Grahic Jump Location
Histories of dynamic stress σr at different locations
Grahic Jump Location
Histories of dynamic stress σθ at different locations
Grahic Jump Location
Histories of dynamic electric displacement D at different locations
Grahic Jump Location
Histories of dynamic electric potential ϕ at different locations

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