Journal article

HASLINGER Jaroslav, KUČERA Radek, ŠÁTEK Václav and SASSI Taoufik. Stokes system with solution-dependent threshold slip boundary conditions: Analysis, approximation and implementation. Mathematics and Mechanics of Solids. 2018, vol. 2018, no. 23, pp. 294-307. ISSN 1081-2865. Available from: http://journals.sagepub.com/doi/full/10.1177/1081286517716222
Publication language:english
Original title:Stokes system with solution-dependent threshold slip boundary conditions: Analysis, approximation and implementation
Pages:294-307
Place:US
Year:2018
URL:http://journals.sagepub.com/doi/full/10.1177/1081286517716222
Journal:Mathematics and Mechanics of Solids, Vol. 2018, No. 23, US
ISSN:1081-2865
DOI:10.1177/1081286517716222
Keywords
Stokes system, threshold slip boundary conditions, solution dependent slip function
Annotation
The paper analyzes the Stokes system with threshold slip boundary conditions of Navier type. Based on the fixedpoint
formulation we prove the existence of a solution for a class of solution-dependent slip functions g satisfying an
appropriate growth condition and its uniqueness provided that g is one-sided Lipschitz continuous. Further we study
under which conditions the respective fixed-point mapping is contractive. To discretize the problem we use P1-bubble/P1
elements. Properties of discrete models in dependence on the discretization parameter are analysed and convergence
results are established. In the second part of the paper we briefly describe the duality approach used in computations
and present results of a model example.
BibTeX:
@ARTICLE{
   author = {Jaroslav Haslinger and Radek Ku{\v{c}}era and
	V{\'{a}}clav {\v{S}}{\'{a}}tek and Taoufik Sassi},
   title = {Stokes system with solution-dependent threshold
	slip boundary conditions: Analysis, approximation
	and implementation},
   pages = {294--307},
   journal = {Mathematics and Mechanics of Solids},
   volume = {2018},
   number = {23},
   year = {2018},
   ISSN = {1081-2865},
   doi = {10.1177/1081286517716222},
   language = {english},
   url = {http://www.fit.vutbr.cz/research/view_pub.php?id=11250}
}

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