. "A non-overlapping domain decomposition is applied to a multibody unilateral contact problem with given friction (Trescas model). Approximations are proposed on the basis of the primary variational formulation (in terms of displacements) and linear finite elements. For the discretized problem we employ the concept of local Schur complements, grouping every two subdomains which share a contact area. The proposed algorithm of successive approximations can be recommended for short contacts only, since the contact areas are not divided by interfaces. The numerical examples show the practical efficiency of the algorithm." . "Domain Decomposition for Generalized Unilateral Semi-Coercive Contact Problem with Given Friction in Elasticity"@en . . . "Metoda rozkladu oblasti pro semi-koercivn\u00ED probl\u00E9my jednostrann\u00E9ho kontaktu pru\u017En\u00FDch t\u011Bles se zadan\u00FDm t\u0159en\u00EDm"@cs . "0378-4754" . . "Mathematics and Computers in Simulation" . "V \u010Dl\u00E1nku je odvozena metoda rozkladu oblasti bez p\u0159ekr\u00FDv\u00E1n\u00ED pro \u00FAlohu jednostrann\u00E9ho kontaktu v\u00EDce t\u011Bles se zadan\u00FDm t\u0159en\u00EDm (Tresc\u016Fv model). Aproximace vych\u00E1z\u00ED z prim\u00E1rn\u00ED varia\u010Dn\u00ED formulace (pro posunut\u00ED) a pou\u017Eit\u00ED metody kone\u010Dn\u00FDch prvk\u016F. Pro diskretizovan\u00FD probl\u00E9m je pou\u017Eita metoda Schurov\u00FDch dopl\u0148k\u016F s t\u00EDm, \u017Ee dvojice podoblast\u00ED v kontaktu jsou uva\u017Eov\u00E1ny dohromady. Odvozen\u00FD algoritmus metody postupn\u00FDch aproximac\u00ED je doporu\u010Den pro \u00FAlohy s kr\u00E1tk\u00FDm kontaktem, proto\u017Ee dekompozici neprov\u00E1d\u00EDme p\u0159es kontaktn\u00ED hranici. Praktick\u00E9 chov\u00E1n\u00ED algoritmu je uk\u00E1z\u00E1no v p\u0159\u00EDkladech."@cs . "Nedoma, Ji\u0159\u00ED" . "Domain Decomposition for Generalized Unilateral Semi-Coercive Contact Problem with Given Friction in Elasticity" . . "domain decomposition; unilateral contact; Tresca's friction model; formulation in isplacements; linear finite elements"@en . . "271;300" . "Hlav\u00E1\u010Dek, Ivan" . "3" . . "Domain Decomposition for Generalized Unilateral Semi-Coercive Contact Problem with Given Friction in Elasticity"@en . . . "P(FT-TA/087), Z(MSM4977751301)" . . . . . "3"^^ . "RIV/67985807:_____/05:00405461" . "30"^^ . "3"^^ . "Domain Decomposition for Generalized Unilateral Semi-Coercive Contact Problem with Given Friction in Elasticity" . . "Dan\u011Bk, Josef" . . . "Metoda rozkladu oblasti pro semi-koercivn\u00ED probl\u00E9my jednostrann\u00E9ho kontaktu pru\u017En\u00FDch t\u011Bles se zadan\u00FDm t\u0159en\u00EDm"@cs . "NL - Nizozemsko" . . "68" . "[0B900C58E472]" . . "A non-overlapping domain decomposition is applied to a multibody unilateral contact problem with given friction (Trescas model). Approximations are proposed on the basis of the primary variational formulation (in terms of displacements) and linear finite elements. For the discretized problem we employ the concept of local Schur complements, grouping every two subdomains which share a contact area. The proposed algorithm of successive approximations can be recommended for short contacts only, since the contact areas are not divided by interfaces. The numerical examples show the practical efficiency of the algorithm."@en . "RIV/67985807:_____/05:00405461!RIV06-MPO-67985807" . . "518590" . . .