"RIV/00216208:11320/10:10057210!RIV11-GA0-11320___" . "RIV/00216208:11320/10:10057210" . "Regularity theorems, up to the boundary, for shear thickening flows"@en . "NL - Nizozemsko" . . . . . "Regularity theorems, up to the boundary, for shear thickening flows"@en . "P(GA201/09/0917), Z(MSM0021620839)" . . . . . "348" . "shear thickening flows; generalized Newtonian fluid; boundary regularity"@en . . . "Beirao da Veiga, Hugo" . "R\u016F\u017Ei\u010Dka, Michael" . . "Regularity theorems, up to the boundary, for shear thickening flows" . . "Regularity theorems, up to the boundary, for shear thickening flows" . "1631-073X" . "284498" . . . . "This Note concerns the regularity up to the boundary of weak solutions to systems describing the flow of generalized Newtonian shear thickening fluids under the homogeneous Dirichlet boundary condition. The extra stress tensor is given by a power law with shear exponent p greater or equal to 2. Complete proofs of the results presented here are given in the forthcoming paper (H. Beirao da Veiga, P. Kaplick\u00FD and M. R\u016F\u017Ei\u010Dka: Boundary regularity of shear thickening flows, Journal of Mathematical Fluid Mechanics, in press). The aim of this Note is to describe the results together with suitable comments."@en . "Comptes Rendus Mathematique" . "11320" . "[1614A4BD32B3]" . . "4"^^ . "9-10" . "This Note concerns the regularity up to the boundary of weak solutions to systems describing the flow of generalized Newtonian shear thickening fluids under the homogeneous Dirichlet boundary condition. The extra stress tensor is given by a power law with shear exponent p greater or equal to 2. Complete proofs of the results presented here are given in the forthcoming paper (H. Beirao da Veiga, P. Kaplick\u00FD and M. R\u016F\u017Ei\u010Dka: Boundary regularity of shear thickening flows, Journal of Mathematical Fluid Mechanics, in press). The aim of this Note is to describe the results together with suitable comments." . "1"^^ . "3"^^ . . "Kaplick\u00FD, Petr" .