. . . . . "21220" . "This paper deals with the numerical solution of Newtonian flows through a bypass connected to main channel in 2D and 3D and non Newtonian flows through branching channels in 2D. The system of the Navier-Stokes equations is used for description of this type of flow. The flows are supposed to be laminar, incompressible, steady and viscous, where the viscosity is not always constant. For numerical solution one could use artificial comperssibility method with three stage Runge-Kutta method and finite volume method in cell centered formulation for discretization of space derivatives. Some results are presented for 2D and 3D case. This problem could have an application in the area of the cardivascular research." . "RIV/68407700:21220/05:02110994!RIV06-MSM-21220___" . . . . "Numerical Solution of Newtonian and Non Newtonian Flows in Channel"@en . "Tento \u010Dl\u00E1nek se zab\u00FDv\u00E1 numerick\u00FDm \u0159e\u0161en\u00EDm proud\u011Bn\u00ED newtonsk\u00E9 tekutiny v kan\u00E1lu s p\u0159ipojen\u00FDm bypassem ve 2D a 3D a proud\u011Bn\u00EDm nenewtonsk\u00E9 tekutiny rozv\u011Btvuj\u00EDc\u00EDm se kan\u00E1lem ve 2D. K popisu proud\u011Bn\u00ED je pou\u017Eit syst\u00E9m Navierov\u00FDch-Stokesov\u00FDch rovnic. Proud\u011Bn\u00ED je pova\u017Eov\u00E1no za lamin\u00E1rn\u00ED, nestla\u010Diteln\u00E9, stacion\u00E1rn\u00ED a vazk\u00E9, kde viskozita nen\u00ED v\u017Edy konstantn\u00ED. Pro nunerick\u00E9 \u0159e\u0161en\u00ED se pou\u017E\u00EDv\u00E1 metoda um\u011Bl\u00E9 stla\u010Ditelnosti, t\u0159\u00EDstup\u0148ov\u00E1 Rungeho-Kuttova metoda a metoda kone\u010Dn\u00FDch objem\u016F v centr\u00E1ln\u00ED formulaci pro prostorov\u00E9 derivace. Jsou uk\u00E1z\u00E1ny n\u011Bkter\u00E9 v\u00FDsledky ve 2D a 3D. \u0158e\u0161en\u00ED tohoto probl\u00E9mu m\u00E1 aplikaci v oblasti kardiovaskul\u00E1rn\u00EDho v\u00FDzkumu."@cs . . "P(IAA100190505), Z(MSM6840770010)" . "Prokop, Vladim\u00EDr" . "\u00DAstav termomechaniky AV \u010CR" . "This paper deals with the numerical solution of Newtonian flows through a bypass connected to main channel in 2D and 3D and non Newtonian flows through branching channels in 2D. The system of the Navier-Stokes equations is used for description of this type of flow. The flows are supposed to be laminar, incompressible, steady and viscous, where the viscosity is not always constant. For numerical solution one could use artificial comperssibility method with three stage Runge-Kutta method and finite volume method in cell centered formulation for discretization of space derivatives. Some results are presented for 2D and 3D case. This problem could have an application in the area of the cardivascular research."@en . . "Numerick\u00E9 \u0159e\u0161en\u00ED proud\u011Bn\u00ED newtonsk\u00E9 a nenewtonsk\u00E9 tekutiny v kan\u00E1lu"@cs . "4"^^ . "Praha" . "Colloquium FLUID DYNAMICS 2005" . "Praha" . . "Numerick\u00E9 \u0159e\u0161en\u00ED proud\u011Bn\u00ED newtonsk\u00E9 a nenewtonsk\u00E9 tekutiny v kan\u00E1lu"@cs . "80-85918-94-3" . "533544" . "Numerical Solution of Newtonian and Non Newtonian Flows in Channel" . . "Keslerov\u00E1, Radka" . . . "Numerical Solution of Newtonian and Non Newtonian Flows in Channel" . . "3"^^ . . "Numerical Solution of Newtonian and Non Newtonian Flows in Channel"@en . "[6225CB23B962]" . . "83 ; 86" . . "Kozel, Karel" . "RIV/68407700:21220/05:02110994" . . "Navier-Stokes equations; Newtonian flows; finite volume method; non Newtonian flows"@en . "3"^^ . . . "2005-10-19+02:00"^^ .