書誌事項
- タイトル別名
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- Revisiting stress propagation in a three-dimensional elastic sphere under diametric loading
説明
<p>The stress propagation for a three-dimensional elastic sphere under a diametric loading condition in the framework of the linear elastodynamics is revisited. By describing displacements in terms of scalar and vector potentials using the Helmholtz theorem, the Navier-Cauchy equation, the time evolution equation for displacements, is converted to the wave equation. The wave equation is Laplace transformed and further solved in spherical coordinates to develop the tabular expressions for displacement and stress in terms of modified spherical Bessel functions, and the coefficients are determined to satisfy the initial and boundary conditions. The obtained solutions are given in the form of an inverse Laplace transform. For the steady solution, the long-time limit of the obtained solutions is derived by using the final value theorem of the Laplace transform. The unsteady solutions are obtained by applying the residue theorem of complex analysis by adding a path with zero contribution in the complex plane. The obtained solution includes longitudinal and transverse waves, and also Rayleigh waves propagating on the surface. The origin of the von Schmidt wave is discussed as a reflected wave produced by the longitudinal wave travelling on the surface. It is also discussed that the wave is bent, unlike in the case of semi-infinite systems.</p>
収録刊行物
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- 日本機械学会論文集
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日本機械学会論文集 90 (933), 23-00262-23-00262, 2024
一般社団法人 日本機械学会
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詳細情報 詳細情報について
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- CRID
- 1390581766253760128
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- ISSN
- 21879761
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- 本文言語コード
- ja
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- 資料種別
- journal article
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- データソース種別
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- JaLC
- Crossref
- KAKEN
- OpenAIRE
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- 抄録ライセンスフラグ
- 使用不可
