2015
DOI: 10.1098/rspa.2014.0827
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Eshelby's problem of polygonal inclusions with polynomial eigenstrains in an anisotropic magneto-electro-elastic full plane

Abstract: This paper presents a closed-form solution for the arbitrary polygonal inclusion problem with polynomial eigenstrains of arbitrary order in an anisotropic magneto-electro-elastic full plane. The additional displacements or eigendisplacements, instead of the eigenstrains, are assumed to be a polynomial with general terms of order M + N. By virtue of the extended Stroh formulism, the induced fields are expressed in terms of a group of basic functions which involve boundary integrals of the inclusion domain. For … Show more

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Cited by 12 publications
(11 citation statements)
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References 39 publications
(71 reference statements)
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“…Let Γ(x − y):= − 1 4π|x−y| . Then owing to (28) 1 and (28) 3 , for any v od ∈ W 2,∞ loc (R 3 ), we can get…”
Section: Cubic Materialsmentioning
confidence: 99%
See 2 more Smart Citations
“…Let Γ(x − y):= − 1 4π|x−y| . Then owing to (28) 1 and (28) 3 , for any v od ∈ W 2,∞ loc (R 3 ), we can get…”
Section: Cubic Materialsmentioning
confidence: 99%
“…Therefore, we have proved that φ * satisfies all of the properties that an obstacle function φ must possess. Then for φ * , the over-determined problem (28) with φ replaced by φ * admits a corresponding solution…”
Section: Cubic Materialsmentioning
confidence: 99%
See 1 more Smart Citation
“…10 Exact closed-form solutions were developed for QDs of different shapes (spherical, cylindrical, ellipsoidal, pyramidal, and arbitrarily shaped polygonal) with graded eigenstrain in piezoelectric matrix (See Refs. [11][12][13] and the references therein). For example, exact closed-form solutions were derived for an arbitrarily shaped polygonal inclusion with any order of polynomial eigenstrains in an anisotropic magneto-electro-elastic full plane.…”
Section: Introductionmentioning
confidence: 99%
“…For example, exact closed-form solutions were derived for an arbitrarily shaped polygonal inclusion with any order of polynomial eigenstrains in an anisotropic magneto-electro-elastic full plane. 11 Solutions of linearly 12 and quadratically 13 graded eigenstrain in an anisotropic piezoelectric half plane were also developed. All the developed analytical models relied on two main assumptions:…”
Section: Introductionmentioning
confidence: 99%