"US - Spojen\u00E9 st\u00E1ty americk\u00E9" . "WSEAS Transactions on Mathematics" . . "Ukazujeme jako hlavn\u00ED v\u00FDsledek, \u017Ee jestli\u017Ee w je siln\u00E9 glob\u00E1ln\u00ED \u0159e\u0161en\u00ED homogenn\u00EDch Navierov\u00FDch-Stokesov\u00FDch rovnic, potom existuje jedno vlastn\u00ED \u010D\u00EDslo (Stokesova oper\u00E1toru), tak \u017Ee mody p\u0159\u00EDslu\u0161n\u00E9 k tomuto vlastn\u00EDmu \u010D\u00EDslu asymptoticky p\u0159eva\u017Euj\u00ED ve w pro \u010Das t bl\u00ED\u017E\u00EDc\u00ED se do nekone\u010Dna."@cs . "Asymptotick\u00E9 chov\u00E1n\u00ED mod\u016F slab\u00FDch \u0159e\u0161en\u00ED Navierov\u00FDch-Stokesov\u00FDch rovnic"@cs . "We show as the main result that if w is a strong global solution of the homogeneous Navier-Stokes equations then there exists one particular eigenvalue (of the Stokes operator) such that the modes associated with this eigenvalue prevail asymptotically in w for the time t approaching infinity."@en . . "Asymptotic behavior of modes in weak solutions to the homogeneous Navier-Stokes equations"@en . . "1"^^ . "P(IAA100190612), Z(AV0Z20600510)" . "280;288" . "Asymptotic behavior of modes in weak solutions to the homogeneous Navier-Stokes equations"@en . . . . "9"^^ . . . . "RIV/67985874:_____/06:00049872" . "[8D08312600C7]" . "5" . . "Navier-Stokes equations; asymptotic behavior"@en . . . "3" . . . "Asymptotick\u00E9 chov\u00E1n\u00ED mod\u016F slab\u00FDch \u0159e\u0161en\u00ED Navierov\u00FDch-Stokesov\u00FDch rovnic"@cs . . "We show as the main result that if w is a strong global solution of the homogeneous Navier-Stokes equations then there exists one particular eigenvalue (of the Stokes operator) such that the modes associated with this eigenvalue prevail asymptotically in w for the time t approaching infinity." . "Asymptotic behavior of modes in weak solutions to the homogeneous Navier-Stokes equations" . "RIV/67985874:_____/06:00049872!RIV07-AV0-67985874" . "Skal\u00E1k, Zden\u011Bk" . . "Asymptotic behavior of modes in weak solutions to the homogeneous Navier-Stokes equations" . "466227" . "1109-2769" . "1"^^ .