On the justification of Koiter’s model for elliptic membrane shells subjected to an interior normal unilateral contact condition

IF 1.8 3区数学 Q1 MATHEMATICS, APPLIED

Nonlinear Analysis-Real World Applications Pub Date : 2025-08-13 DOI:10.1016/j.nonrwa.2025.104473

Paolo Piersanti

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引用次数: 0

Abstract

The purpose of this paper is twofold. First, we rigorously justify Koiter’s model for linearly elastic elliptic membrane shells in the case where the shell is subject to a geometrical constraint modelled via an interior normal unilateral contact condition defined in the interior of the shell. To achieve this, we establish a novel density result for non-empty, closed, and convex subsets of Lebesgue spaces, which are applicable to cases not covered by the “density property” established in Ciarlet et al. (2019).

Second, we demonstrate that the solution to the two-dimensional obstacle problem for linearly elastic elliptic membrane shells, subjected to the interior normal unilateral contact condition, exhibits higher regularity throughout its entire definition domain. A key feature of this result is that, while the transverse component of the solution is, in general, only of class

L^{2}

and its trace is a priori undefined, the methodology proposed here, partially based on Ciarlet and Sanchez-Palencia (1996), enables us to rigorously establish the well-posedness of the trace for the transverse component of the solution by means of an ad hoc formula.

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椭圆膜壳内正接触条件下Koiter模型的合理性

本文的目的是双重的。首先，我们严格地证明了Koiter的线性弹性椭圆膜壳模型，在这种情况下，壳受到几何约束，通过在壳内部定义的内部法向单边接触条件建模。为了实现这一点，我们为Lebesgue空间的非空、封闭和凸子集建立了一个新的密度结果，该结果适用于Ciarlet等人（2019）中建立的“密度性质”未涵盖的情况。其次，我们证明了线弹性椭圆膜壳二维障碍问题的解在其整个定义域中具有较高的正则性。这个结果的一个关键特征是，虽然解的横向分量一般只属于L2类，而且它的迹是先验未定义的，但这里提出的方法（部分基于Ciarlet和Sanchez-Palencia(1996)）使我们能够通过一个特别公式严格地建立解的横向分量的迹的完备性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Nonlinear Analysis-Real World Applications 数学-应用数学

CiteScore

3.80

自引率

5.00%

发文量

176

审稿时长

59 days

期刊介绍： Nonlinear Analysis: Real World Applications welcomes all research articles of the highest quality with special emphasis on applying techniques of nonlinear analysis to model and to treat nonlinear phenomena with which nature confronts us. Coverage of applications includes any branch of science and technology such as solid and fluid mechanics, material science, mathematical biology and chemistry, control theory, and inverse problems. The aim of Nonlinear Analysis: Real World Applications is to publish articles which are predominantly devoted to employing methods and techniques from analysis, including partial differential equations, functional analysis, dynamical systems and evolution equations, calculus of variations, and bifurcations theory.