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An asymptotic analysis method for the linearly shell theory
In this paper, we consider a linearly elastic shell, I.e. A three-dimensional linearly elastic body with a small thickness denoted by 2ε, which is clamped along its part of the lateral boundary and subjected to the regular loads. In the linear case, one can use the two-dimensional models of Ciarlet or Koiter to calculate the displacement for the shell. Some error estimates between the approximate solution of these models and the three-dimensional displacement vector field of a flexural or membrane shell have been obtained. Here we give a new model for a linear and nonlinear shell, prove that there exists a unique solution U of the two-dimensional variational problem and construct a three-dimensional approximate solutions UKT(x,ξ) in terms of U:{ UKT(x,ξ):=U(x)+П1Uξ+П2Uξ2,П1U=-aαβ*▽?duì)耈3→eα-λ0γ0(U)→n,П2U=(1/λ+μ)*▽?duì)?aαβλσ+γλσ(U))-bαβ*▽?duì)耈3)→eα+1/2λ0(ρKT0(U)-(1+λ0)Hγ0(U)-2β0(U))→n.We also provide the error estimates between our model and the three-dimensional displacement vector field:‖u-UKT‖1,(Ω)≤Cεr, r=3/2, an elliptic membrane, r=1/2, a general membrane,where C is a constant dependent only upon the data ‖u‖3,Ω, ‖UKT‖3,Ω, →θ.
作 者: LI Kaitai ZHANG Wenling HUANG Aixiang 作者單位: College of Sciences, Xi'an Jiaotong University, Xi'an 710049, China 刊 名: 中國(guó)科學(xué)A輯(英文版) SCI 英文刊名: SCIENCE IN CHINA (MATHEMATICS) 年,卷(期): 2006 49(8) 分類號(hào): O1 關(guān)鍵詞: linear elastic shell asymptotic expansion method【An asymptotic analysis method for th】相關(guān)文章:
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