Signorini type variational inequality with state-dependent discontinuous multi-valued boundary operators

We consider an elliptic variational inequality of Signorini type in a bounded domain Ω⊂RN of the form: find u∈K and ξ∈∂2β(γu,γu) such that 〈Au,v−u〉+∫ΓSξ(γv−γu)dσ≥0,∀v∈K, where A is a quasilinear elliptic operator in divergence form, K is the nonempty, closed, convex set representing the thin obstacl...

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Vydané v:	Nonlinear analysis Ročník 92; s. 138 - 152
Hlavný autor:	Carl, Siegfried
Médium:	Journal Article
Jazyk:	English
Vydavateľské údaje:	Elsevier Ltd 01.11.2013
Predmet:	Adhesion Boundaries Comparison principle Contact Discontinuous multi-valued function Extremal solution Friction Inequalities Laws Mathematical analysis Operators Signorini type variational inequality Sub–supersolution Variational inequality 35J87 35R70 Sub–supersolution 47J20 Discontinuous multi-valued function Variational inequality Signorini type variational inequality Extremal solution Comparison principle 47H04
ISSN:	0362-546X, 1873-5215
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Popis
Shrnutí:	We consider an elliptic variational inequality of Signorini type in a bounded domain Ω⊂RN of the form: find u∈K and ξ∈∂2β(γu,γu) such that 〈Au,v−u〉+∫ΓSξ(γv−γu)dσ≥0,∀v∈K, where A is a quasilinear elliptic operator in divergence form, K is the nonempty, closed, convex set representing the thin obstacle (Signorini problem) on ΓS⊂∂Ω, and γ:W1,p(Ω)→Lp(∂Ω) denotes the trace operator. The multi-valued boundary operator is generated by the multifunction s↦∂2β(s,s), where β:R×R→R is a function such that s↦β(r,s) is supposed to be locally Lipschitz for all r∈R, while r↦β(r,s) is allowed to be discontinuous, and ∂2β(r,s) stands for Clarke’s generalized gradient of β with respect to its second argument. The novelty of this paper is that the multifunction r↦∂2β(r,s) may discontinuously depend on r in a certain specified way, which gives rise to a new class of discontinuous, nonmonotone, multi-valued boundary operators that is rich in structure to cover a wide range of multi-valued constitutive laws on the contact surface ΓS such as, e.g., multi-valued adhesion and friction laws that are not necessarily of subdifferential type. Our main goal is to provide an analytical framework to prove existence, enclosure and comparison results for this new class of multi-valued boundary variational inequalities that includes the theory of variational–hemivariational inequalities as special case.
Bibliografia:	ObjectType-Article-2 SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 23
ISSN:	0362-546X 1873-5215
DOI:	10.1016/j.na.2013.07.016