Green's functions of magnetoelectroelastic solids with a half-plane boundary or bimaterials interface
Date
2004
Authors
Qin, Qing Hua
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Publisher
Taylor & Francis Group
Abstract
Green's functions for magnetoelectroelastic medium with an arbitrarily oriented half-plane or bimaterial interface are presented in this paper. The derivation is based on an extended Stroh's formalism and coordinate-transform technique. In particular, a new coordinate variable is introduced to handle vertical or other boundary problems. These Green's functions satisfy related boundary or interface conditions. The Green's functions obtained can be used to establish boundary-element formulation and to analyse fracture behaviour involving half-plane boundaries or bimaterial interfaces.
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Keywords: Boundary element method; Boundary value problems; Electrostatics; Green's function; Interfaces (materials); Magnetoelectric effects; Mathematical transformations; Matrix algebra; Problem solving; Bimaterial interfaces; Half-plane boundary; Magnetoelectros
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Philosophical Magazine Letters
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Journal article
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2037-12-31
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