. "3"^^ . . . . . "0170-4214" . "Uva\u017Eujeme stacion\u00E1rn\u00ED stla\u010Diteln\u00E9 Navier-Stokesovy rovnice v izentropick\u00E9m re\u017Eimu ve t\u0159\u00EDdimenzion\u00E1ln\u00ED oblasti s n\u011Bkolika exity do nekone\u010Dna s p\u0159edepsan\u00FDm rozd\u00EDlem tlak\u016F. Na jedn\u00E9 stran\u011B, obsahuje-li ka\u017Ed\u00FD exit uvnit\u0159 n\u011Bjak\u00FD ku\u017Eel, zkonstruujeme slab\u00E9 \u0159e\u0161en\u00ED s omezenou energi\u00ED pro adiabatickou konstantu $\\gamma gt 3$. Na druhou stranu, pokud se exity neotev\u00EDraj\u00ED dostate\u010Dn\u011B rychle, uk\u00E1\u017Eeme, \u017Ee \u0159e\u0161en\u00ED obecn\u011B nemus\u00ED existovat."@cs . . . "12" . . "GB - Spojen\u00E9 kr\u00E1lovstv\u00ED Velk\u00E9 Brit\u00E1nie a Severn\u00EDho Irska" . "35"^^ . "11320" . "RIV/00216208:11320/05:00001176!RIV06-MSM-11320___" . . . . "P(GA201/03/0934), P(GP201/02/P091), Z(MSM 113200007)" . "Stacion\u00E1rn\u00ED stla\u010Diteln\u00E9 Navier-Stokesovy rovnice v oblastech s nekompaktn\u00EDmi hranicemi"@cs . . . . . . "28" . "We consider the steady compressible Navier-Stokes equations of isentropic flow in three-dimensional domains with several exits to infinity with prescribed pressure drops. On the one hand, when each exit is supposed to contain a cone inside, we shall construct bounded energy weak solution for adiabatic constant $\\gamma gt 3$. On the other hand, when the exits do not open sufficiently rapidly, we shall prove a non-existence result."@en . "Steady compressible Navier-Stokes equations in domains with non-compact boundaries" . "Steady; compressible; Navier-Stokes; equations; domains; non-compact; boundaries"@en . "Stacion\u00E1rn\u00ED stla\u010Diteln\u00E9 Navier-Stokesovy rovnice v oblastech s nekompaktn\u00EDmi hranicemi"@cs . . . "Steady compressible Navier-Stokes equations in domains with non-compact boundaries" . "544640" . "Steady compressible Navier-Stokes equations in domains with non-compact boundaries"@en . . "We consider the steady compressible Navier-Stokes equations of isentropic flow in three-dimensional domains with several exits to infinity with prescribed pressure drops. On the one hand, when each exit is supposed to contain a cone inside, we shall construct bounded energy weak solution for adiabatic constant $\\gamma gt 3$. On the other hand, when the exits do not open sufficiently rapidly, we shall prove a non-existence result." . "1445;1479" . "Steady compressible Navier-Stokes equations in domains with non-compact boundaries"@en . "RIV/00216208:11320/05:00001176" . "Pokorn\u00FD, Milan" . . . "[6766972934F3]" . "Mathematical Methods in the Applied Sciences" . . "1"^^ .