Sharp Weighted Korn and Korn-Like Inequalities and an Application to Washers

详细信息    查看全文

• 作者：Davit Harutyunyan
• 关键词：Korn inequality ; Elasticity ; Thin domains ; Shells ; Plates ; Washers
• 刊名：Journal of Elasticity
• 出版年：2017
• 出版时间：March 2017
• 年：2017
• 卷：127
• 期：1
• 页码：59-77
• 全文大小：
• 刊物类别：Physics and Astronomy
• 刊物主题：Classical Mechanics; Automotive Engineering;
• 出版者：Springer Netherlands
• ISSN：1573-2681
• 卷排序：127

文摘

In this paper we prove asymptotically sharp weighted “first-and-a-half” \(2D\) Korn and Korn-like inequalities with a singular weight occurring from Cartesian to cylindrical change of variables. We prove some Hardy and the so-called “harmonic function gradient separation” inequalities with the same singular weight. Then we apply the obtained \(2D\) inequalities to prove similar inequalities for washers with thickness \(h\) subject to vanishing Dirichlet boundary conditions on the inner and outer thin faces of the washer. A washer can be regarded in two ways: As the limit case of a conical shell when the slope goes to zero, or as a very short hollow cylinder. While the optimal Korn constant in the first Korn inequality for a conical shell with thickness \(h\) and with a positive slope scales like \(h^{1.5}\), e.g., (Grabovsky and Harutyunyan in arXiv:1602.03601, 2016), the optimal Korn constant in the first Korn inequality for a washer scales like \(h^{2}\) and depends only on the outer radius of the washer as we show in the present work. The Korn constant in the first and a half inequality scales like \(h\) and depends only on \(h\). The optimal Korn constant is realized by a Kirchhoff Ansatz. This results can be applied to calculate the critical buckling load of a washer under in plane loads, e.g., (Antman and Stepanov in J. Elast. 124(2):243–278, 2016).