Weak solvability of elliptic variational inequalities coupled with a nonlinear differential equation

IF 1.8 3区 数学 Q1 MATHEMATICS, APPLIED Nonlinear Analysis-Real World Applications Pub Date : 2024-09-14 DOI:10.1016/j.nonrwa.2024.104216
Nadia Skoglund Taki
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Abstract

In this paper we establish existence, uniqueness, and boundedness results for an elliptic variational inequality coupled with a nonlinear ordinary differential equation. Under the general framework, we present a new application modeling the antiplane shear deformation of a static frictional adhesive contact problem. The adhesion process has been extensively studied, but it is usual to assume a priori that the intensity of adhesion is bounded by introducing truncation operators. The aim of this article is to remove this restriction.

The proof is based on an iterative approximation scheme showing that the problem has a unique solution. A key ingredient is finding uniform a priori bounds for each iterate. These are obtained by adapting versions of the Moser iteration to our system of equations.

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与非线性微分方程耦合的椭圆变分不等式的弱可解性
在本文中,我们建立了与非线性常微分方程耦合的椭圆变分不等式的存在性、唯一性和有界性结果。在一般框架下,我们提出了一个新的应用模型,即静态摩擦粘合接触问题的反平面剪切变形。粘附过程已被广泛研究,但通常是通过引入截断算子先验地假定粘附强度是有界的。本文的目的是消除这一限制。证明基于迭代近似方案,表明问题有唯一解。证明的关键是为每个迭代找到统一的先验边界。这些先验界限是通过将莫瑟迭代法的各个版本与我们的方程系统相匹配而获得的。
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来源期刊
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.
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