Abstract
We consider a frictionless contact problem, Problem , for elastic materials. The process is assumed to be static and the contact is modelled with unilateral constraints. We list the assumptions on the data and derive a variational formulation of the problem, Problem . Then we consider a perturbation of Problem , which could be frictional, governed by a small parameter . This perturbation leads in a natural way to a family of sets . We prove that Problem is well-posed in the sense of Tykhonov with respect to the family . The proof is based on arguments of monotonicity, pseudomonotonicity and various estimates. We extend these results to a time-dependent version of Problem . Finally, we provide examples and mechanical interpretation of our well-posedness results, which, in particular, allow us to establish the link between the weak solutions of different contact models.
Published Version
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