Deformations Without Bending: Explicit Examples

Q4 Mathematics
V. Pulov, M. Hadzhilazova, I. Mladenov
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引用次数: 1

Abstract

Here we consider an interesting class of free of bending deformations of thin axial symmetric shells subjected to uniform normal pressure. The meridional kμ and the parallel kπ principal curvatures of the middle surfaces of such shells obey the non-linear relationship kμ = 2ak π + 3kπ , a = const. These non-bending shells depend on two arbitrary parameters, which are the principal radii rμ and rπ of some fixed parallel of the shell. Besides, these surfaces have no closed form description in elementary functions. Our principle aim here is to present such a parameterization of the whole class of non-bending closed surfaces by making use of the canonical forms of the elliptic integrals. The obtained explicit formulas are then applied for the derivation of the basic geometrical characteristics of these surfaces. MSC : 74K25, 74A10, 53A04, 53A05, 33E05
没有弯曲的变形:明确的例子
这里我们考虑一类有趣的无弯曲变形的薄轴对称壳受到均匀法向压力。这种壳的中间表面的子午线主曲率kμ和平行主曲率kπ服从非线性关系kμ = 2ak π + 3kπ, a = const。这些非弯曲壳依赖于两个任意参数,即壳的固定平行线的主半径rμ和rπ。此外,这些曲面在初等函数中没有封闭形式描述。本文的主要目的是利用椭圆积分的正则形式,给出一类非弯曲闭曲面的参数化。然后应用得到的显式公式推导出这些曲面的基本几何特性。MSC: 74k25, 74a10, 53a04, 53a05, 33e05
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来源期刊
Geometry, Integrability and Quantization
Geometry, Integrability and Quantization Mathematics-Mathematical Physics
CiteScore
0.70
自引率
0.00%
发文量
4
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