Minimization arguments in analysis of variational-hemivariational inequalities

被引:3
|
作者
Sofonea, Mircea [1 ]
Han, Weimin [2 ]
机构
[1] Univ Perpignan, Lab Math & Phys, Via Domitia,52 Ave Paul Alduy, F-66860 Perpignan, France
[2] Univ Iowa, Dept Math, Iowa City, IA 52242 USA
来源
ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND PHYSIK | 2022年 / 73卷 / 01期
关键词
Variational-hemivariational inequality; Minimization principle; Well-posedness; Fixed point argument; Mosco convergence; Elastic contact; NUMERICAL-ANALYSIS; CONVERGENCE;
D O I
10.1007/s00033-021-01638-z
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper, an alternative approach is provided in the well-posedness analysis of elliptic variational-hemivariational inequalities in real Hilbert spaces. This includes the unique solvability and continuous dependence of the solution on the data. In most of the existing literature on elliptic variational-hemivariational inequalities, well-posedness results are obtained by using arguments of surjectivity for pseudomonotone multivalued operators, combined with additional compactness and pseudomonotonicity properties. In contrast, following (Han in Nonlinear Anal B Real World Appl 54:103114, 2020; Han in Numer Funct Anal Optim 42:371-395, 2021), the approach adopted in this paper is based on the fixed point structure of the problems, combined with minimization principles for elliptic variational-hemivariational inequalities. Consequently, only elementary results of functional analysis are needed in the approach, which makes the theory of elliptic variational-hemivariational inequalities more accessible to applied mathematicians and engineers. The theoretical results are illustrated on a representative example from contact mechanics.
引用
收藏
页数:18
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