"Unilateral contact with Coulomb friction and uncertain input data" . . "[72614769E462]" . . "Unilateral contact with Coulomb friction and uncertain input data" . "US - Spojen\u00E9 st\u00E1ty americk\u00E9" . . "RIV/67985840:_____/03:00023244!RIV06-AV0-67985840" . "RIV/67985840:_____/03:00023244" . "Hlav\u00E1\u010Dek, Ivan" . "0163-0563" . "24" . . . . "Uva\u017Euje se kvazivaria\u010Dn\u00ED nerovnice Rd, d = 2,3 s perturbovan\u00FDmi vstupn\u00EDmi daty. Na z\u00E1klad\u011B jist\u00E9ho v\u00FDsledku o stabilit\u011B mno\u017Einy \u0159e\u0161en\u00ED ( jde o nejednozna\u010Dn\u00E9 \u0159e\u0161en\u00ED ) je probl\u00E9m \u0159e\u0161en metodou nejhor\u0161\u00EDho sc\u00E9n\u00E1\u0159e. Teorie je aplikov\u00E1na na du\u00E1ln\u00ED formulaci Signoriniho \u00FAlohy s Coulombovsk\u00FDm t\u0159en\u00EDm a nejist\u00FDmi koeficienty zobecn\u011Bn\u00E9ho Hookeova z\u00E1kona, t\u0159en\u00ED a zat\u00ED\u017Een\u00ED."@cs . . . "Jednostrann\u00FD kontakt s Coulombovsk\u00FDm t\u0159en\u00EDm a nejist\u00FDmi vstupn\u00EDmi daty"@cs . "5-6" . . . . . "Jednostrann\u00FD kontakt s Coulombovsk\u00FDm t\u0159en\u00EDm a nejist\u00FDmi vstupn\u00EDmi daty"@cs . "Unilateral contact with Coulomb friction and uncertain input data"@en . . "509;530" . "P(GA201/01/1200), P(GA201/02/1058), Z(AV0Z1019905)" . "Numerical Functional Analysis and Optimization" . "implicit variational inequality; quasivariational inequality; duality"@en . . . "22"^^ . "632075" . . "A quasivariational inequality (QVI) in Rd, d = 2,3, with perturbed input data is solved by means of a worst scenario (anti-optimization) approach, using a stability result for the solution set of perturbed QVI-problems. The theory is applied to the dual finite element formulation of the Signorini problem with Coulomb friction and uncertain coefficients of stress-strain law, friction, and loading."@en . . "Unilateral contact with Coulomb friction and uncertain input data"@en . "1"^^ . . "1"^^ . "A quasivariational inequality (QVI) in Rd, d = 2,3, with perturbed input data is solved by means of a worst scenario (anti-optimization) approach, using a stability result for the solution set of perturbed QVI-problems. The theory is applied to the dual finite element formulation of the Signorini problem with Coulomb friction and uncertain coefficients of stress-strain law, friction, and loading." .