Mathematical modeling of delamination and nonmonotone friction problems by hemivariational inequalities

Charalambos C. Baniotopoulos; Jaroslav Haslinger; Zuzana Morávková

Displaying similar documents to “Mathematical modeling of delamination and nonmonotone friction problems by hemivariational inequalities”

Approximation and numerical realization of 3D contact problems with given friction and a coefficient of friction depending on the solution

Jaroslav Haslinger, Tomáš Ligurský (2009)

Applications of Mathematics

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The paper presents the analysis, approximation and numerical realization of 3D contact problems for an elastic body unilaterally supported by a rigid half space taking into account friction on the common surface. Friction obeys the simplest Tresca model (a slip bound is given a priori) but with a coefficient of friction $ℱ$ which depends on a solution. It is shown that a solution exists for a large class of $ℱ$ and is unique provided that $ℱ$ is Lipschitz continuous with a sufficiently small...

A frictionless contact problem for viscoelastic materials.

Barboteu, Mikäel, Han, Weimin, Sofonea, Mircea (2002)

Journal of Applied Mathematics

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Signorini problem with a solution dependent coefficient of friction (model with given friction): Approximation and numerical realization

Jaroslav Haslinger, Oldřich Vlach (2005)

Applications of Mathematics

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Contact problems with given friction and the coefficient of friction depending on their solutions are studied. We prove the existence of at least one solution; uniqueness is obtained under additional assumptions on the coefficient of friction. The method of successive approximations combined with the dual formulation of each iterative step is used for numerical realization. Numerical results of model examples are shown.

A sign preserving mixed finite element approximation for contact problems

Patrick Hild (2011)

International Journal of Applied Mathematics and Computer Science

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This paper is concerned with the frictionless unilateral contact problem (i.e., a Signorini problem with the elasticity operator). We consider a mixed finite element method in which the unknowns are the displacement field and the contact pressure. The particularity of the method is that it furnishes a normal displacement field and a contact pressure satisfying the sign conditions of the continuous problem. The a priori error analysis of the method is closely linked with the study of...