. "Flow-Induced Vibration" . "Ecole Polytechnique, Paris" . "Stability of unsymmetrically supported cylindrical shells conveying the fluid" . . . "Stability of unsymmetrically supported cylindrical shells conveying the fluid" . "6"^^ . "Stability of unsymmetrically supported cylindrical shells conveying the fluid"@en . "2-7302-1141-1" . "Stabilita nesymetricky upevn\u011Bn\u00E9 v\u00E1lcov\u00E9 sko\u0159epiny prot\u00E9kan\u00E9 tekutinou"@cs . "P(IAA2076101), Z(AV0Z2076919)" . "Pa\u0159\u00ED\u017E" . "Pa\u0159\u00ED\u017E" . . "Stabilita nesymetricky upevn\u011Bn\u00E9 v\u00E1lcov\u00E9 sko\u0159epiny prot\u00E9kan\u00E9 tekutinou"@cs . . "1"^^ . . "587710" . "Jsou studov\u00E1ny vlastn\u00ED frekvence a hranice ztr\u00E1ty stability tenkost\u011Bnn\u00E9 v\u00E1lcov\u00E9 sko\u0159epiny prot\u00E9kan\u00E9 tekutinou. Pr\u00E1ce je zalo\u017Eena na potenci\u00E1ln\u00ED teorie proud\u011Bn\u00ED pro tekutinu a poloohybov\u00E9 teorie sko\u0159epin. Sko\u0159epina kone\u010Dn\u00E9 d\u00E9lky je uva\u017Eov\u00E1na za podm\u00EDnek nesymetrick\u00E9ho upevn\u011Bn\u00ED okraj\u016F, p\u0159i\u010Dem\u017E jsou uva\u017Eov\u00E1ny r\u016Fzn\u00E9 p\u0159\u00EDpady okrajov\u00FDch podm\u00EDnek."@cs . . "Zolotarev, Igor" . . "1"^^ . "[5714248A427F]" . "stability of unsymmetricallly cylindrical shells;semi-membrane shell theory"@en . "Natural frequencies and the thresholds for loosing the stability of thin-walled cylindrical hell conveying the flowing fluid are theoretically studied. Potential flow theory for fluid and semi-membrane theory of shells are used. The shells of finite length are considered for different cases of boundary conditions at the edges of the shell"@en . "Stability of unsymmetrically supported cylindrical shells conveying the fluid"@en . "203;208" . . . "RIV/61388998:_____/04:00103550" . . . . . . "2004-07-06+02:00"^^ . "Natural frequencies and the thresholds for loosing the stability of thin-walled cylindrical hell conveying the flowing fluid are theoretically studied. Potential flow theory for fluid and semi-membrane theory of shells are used. The shells of finite length are considered for different cases of boundary conditions at the edges of the shell" . . . "RIV/61388998:_____/04:00103550!RIV/2005/AV0/A51005/N" .