Minimization principles for elliptic hemivariational inequalities

Weimin Han

doi:10.1016/j.nonrwa.2020.103114

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Minimization principles for elliptic hemivariational inequalities

Journal article

Peer reviewed

Minimization principles for elliptic hemivariational inequalities

Weimin Han

Nonlinear analysis: real world applications, Vol.54, p.103114

08/2020

DOI: 10.1016/j.nonrwa.2020.103114

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Abstract

In this paper, we explore conditions under which certain elliptic hemivariational inequalities permit equivalent minimization principles. It is shown that for an elliptic variational–hemivariational inequality, under the usual assumptions that guarantee the solution existence and uniqueness, if an additional condition is satisfied, the solution of the variational–hemivariational inequality is also the minimizer of a corresponding energy functional. Then, two variants of the equivalence result are given, that are more convenient to use for applications in contact mechanics and in numerical analysis of the variational–hemivariational inequality. When the convex terms are dropped, the results on the elliptic variational–hemivariational inequalities are reduced to that on “pure” elliptic hemivariational inequalities. Finally, two representative examples from contact mechanics are discussed to illustrate application of the theoretical results.

Hemivariational inequality

Minimization principle

Variational–hemivariational inequality

Details

Title: Subtitle: Minimization principles for elliptic hemivariational inequalities
Creators: Weimin Han - University of Iowa
Resource Type: Journal article
Publication Details: Nonlinear analysis: real world applications, Vol.54, p.103114
Publisher: Elsevier Ltd
DOI: 10.1016/j.nonrwa.2020.103114
ISSN: 1468-1218
eISSN: 1878-5719
Language: English
Date published: 08/2020
Academic Unit: Mathematics
Record Identifier: 9984241037402771

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