"Uva\u017Euje se obecn\u00FD koercivn\u00ED okrajov\u00FD probl\u00E9m pro K\u00E1rm\u00E1n\u016Fv syst\u00E9m. Zat\u00ED\u017Een\u00ED kolm\u00E9 k rovin\u011B desky i v rovin\u011B desky je nejist\u00E9 a je obsa\u017Eeno v dan\u00E9 kompaktn\u00ED mno\u017Ein\u011B p\u0159\u00EDpustn\u00FDch funkc\u00ED. Definuje se probl\u00E9m nejhor\u0161\u00EDho sc\u00E9n\u00E1\u0159e, p\u0159i\u010Dem\u017E se bere v \u00FAvahu mo\u017En\u00E1 v\u00EDcezna\u010Dnost \u0159e\u0161en\u00ED K\u00E1rm\u00E1nova syst\u00E9mu. Je uveden d\u016Fkaz existence nejhor\u0161\u00EDho sc\u00E9n\u00E1\u0159e."@cs . "RIV/67985840:_____/07:00098860!RIV08-AV0-67985840" . "RIV/67985840:_____/07:00098860" . "Von K\u00E1rm\u00E1n equations with uncertain input data and the worst scenario method"@en . "DE - Spolkov\u00E1 republika N\u011Bmecko" . "1"^^ . "control of non-linear elliptic systems; uncertain input data; large deffection of elastic plates"@en . "0044-2267" . . . "1"^^ . "15"^^ . "[85D69EFED5E0]" . "ZAMM-Zeitschrift fur Angewandte Mathematik und Mechanik" . . "Von K\u00E1rm\u00E1novy rovnice s nejist\u00FDmi vstupn\u00EDmi daty a metoda nejhor\u0161\u00EDho sc\u00E9n\u00E1\u0159e"@cs . "Z(AV0Z10190503)" . "Von K\u00E1rm\u00E1n equations with uncertain input data and the worst scenario method" . . . . . . . "Von K\u00E1rm\u00E1n equations with uncertain input data and the worst scenario method"@en . "Hlav\u00E1\u010Dek, Ivan" . . . "Von K\u00E1rm\u00E1novy rovnice s nejist\u00FDmi vstupn\u00EDmi daty a metoda nejhor\u0161\u00EDho sc\u00E9n\u00E1\u0159e"@cs . "747;761" . "A general coercive boundary value problem for the von K\u00E1rm\u00E1n system is considered. Both the perpendicular and in-plane loading is uncertain, being contained in some compact set of admissible data. Then the worst scenario problem is defined, taking the possible nonuniqueness of the solution of the von K\u00E1rm\u00E1n system into consideration. A proof is presented for the existence of the worst scenario."@en . "A general coercive boundary value problem for the von K\u00E1rm\u00E1n system is considered. Both the perpendicular and in-plane loading is uncertain, being contained in some compact set of admissible data. Then the worst scenario problem is defined, taking the possible nonuniqueness of the solution of the von K\u00E1rm\u00E1n system into consideration. A proof is presented for the existence of the worst scenario." . "87" . . "10" . . . "459124" . . "Von K\u00E1rm\u00E1n equations with uncertain input data and the worst scenario method" .