The Love Equation for the Normal Loading of a Rigid Cone on an Elastic Half-Space and a Recent Modification : A Review (Special Issue on Recent Advances in Indentation Technique)
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- 資料種別
- 記事
- 著者・編者
- M. Munawar Chaudhri
- タイトル(掲載誌)
- Materials transactions
- 巻号年月日等(掲載誌)
- 60(8):2019.8
- 掲載巻
- 60
- 掲載号
- 8
- 掲載ページ
- 1404-1410
- 掲載年月日(W3CDTF)
- 2019-08
- ISSN(掲載誌)
- 1345-9678
- ISSN-L(掲載誌)
- 1345-9678
- 出版事項(掲載誌)
- Sendai : The Japan Institute of Metals and Materials ; 2001-
- 出版地(国名コード)
- JP
- 本文の言語コード
- eng
- 件名標目
- NDLC
- 対象利用者
- 一般
- 所蔵機関
- 国立国会図書館
- 請求記号
- Z53-J286
- 連携機関・データベース
- 国立国会図書館 : 国立国会図書館雑誌記事索引
- 書誌ID(NDLBibID)
- 029819085
- 整理区分コード
- 632
- 要約等
- <p>This review confirms that the Love equation which connects the load on a rigid cone loaded normally on an elastic half-space, and its penetration into the half space, has been verified by several theoreticians. Furthermore, the predictions of the Love equation have been experimentally validated. It is argued here that a modification of the Love equation made about 20 years ago is incompatible with several theoretical treatments as well as with the expression for radial surface particle displacement outside the contact. Moreover, it is also shown that normal loading behaviour of a rigid cone on an elastic half-space cannot be likened to that of the normal loading behaviour of a rigid three-sided or a four-sided pyramid. Lastly, corrections are made to some important expressions given in a well cited paper by Sneddon (1965).</p>
- DOI
- 10.2320/matertrans.md201908
- 関連情報(URI)
- 参照
- Recent Advances in Indentation Techniques and Their Application to Mechanical Characterization
- 参照
- Mechanical properties of silicones for MEMSIndentation of elastic solids with rigid conesIndentation of elastic solids with a rigid Vickers pyramidal indenterHertzian load–displacement relation holds for spherical indentation on soft elastic solids undergoing large deformationsBOUSSINESQ'S PROBLEM FOR A RIGID CONEAnalysis of Berkovich indentationElastic and viscoelastic indentation of flat surfaces by pyramid indentorsThe Love equation for the normal loading of a rigid cone on an elastic half-space: no need for a modificationThe relation between load and penetration for a spherical punchAdhesive contact and kinetics of adherence of a rigid conical punch on an elastic half-space (natural rubber)The elastic stresses produced by the indentation of the plane surface of a semi-infinite elastic solid by a rigid punchPressure Distributions beneath Spherical and Conical Shapes pressed into a Rubber Plane, and their Bearing on Coefficients of Friction under Wet ConditionsAn approximate solution for the contact area and elastic compliance of a smooth punch of arbitrary shapeThe effect of indenter geometry on the elastic response to indentationA critical examination of the fundamental relations used in the analysis of nanoindentation dataSome concerns about the current interpretation and analyses of indentation unloading <i>P – h</i> curves highlighted with Young's modulus studies of single crystals of MgO (100)The relation between load and penetration in the axisymmetric boussinesq problem for a punch of arbitrary profile
- 連携機関・データベース
- 国立情報学研究所 : CiNii Research
- 提供元機関・データベース
- Japan Link Center雑誌記事索引データベースCrossrefCiNii ArticlesCrossref
- 書誌ID(NDLBibID)
- 029819085
- NII論文ID
- 130007683597