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Shallow water equations for power law and Bingham fluids |
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| Authors: | Enrique D Fernández-Nieto Pascal Noble Jean-Paul Vila |
| Institution: | FERNANDEZ-NIETO Enrique D.1,NOBLE Pascal2 & VILA Jean-Paul3 1Departamento de Matemtica Aplicada I,Universidad de Sevilla,41012 Sevilla,Spain;2Université de Lyon,Université Lyon1 Institut Camille Jordan,UMR CNRS 520843,blvd du 11 novembre 1918,F-69622 Villeurbanne Cedex,France;3Institut de Math’ematiques de Toulouse,UMR CNRS 5219,INSA de Toulouse,135 avenue de Rangueil,31077 Toulouse Cedex 4,France |
| Abstract: | In this note, we provide a consistant thin layer theory for power law and Bingham incompressible fluids flowing down an inclined plane under the effect of gravity. The derivation of such equations is based on formal asymptotic expansions of solutions of Cauchy momentum equations in the shallow water scaling and in the neighbourhood of steady solutions so that we can close the average equations on the fluid height h and the total discharge rate q. |
| Keywords: | shallow water equations asymptotic analysis non-Newtonian fluids |
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