Global Existence of Bounded Solutions for Eyring–Powell Flow in a Semi-Infinite Rectangular Conduct

The purpose of the present study is to obtain regularity results and existence topics regarding an Eyring–Powell fluid. The geometry under study is given by a semi-infinite conduct with a rectangular cross section of dimensions L×H. Starting from the initial velocity profiles (u01,u02) in xy-planes,...

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Detalles Bibliográficos
Autores: Rahman, Saeed, Díaz Palencia, José Luis, Nomaq, Tariq, Salgado, Pablo, Roa González, Julián
Tipo de recurso: artículo
Fecha de publicación:2022
País:España
Institución:Universidad a Distancia de Madrid (UDIMA)
Repositorio:udiMundus. Repositorio Institucional de la Universidad a Distancia de Madrid
OAI Identifier:oai:udimundus.udima.es:20.500.12226/1445
Acceso en línea:http://hdl.handle.net/20.500.12226/1445
Access Level:acceso abierto
Palabra clave:nonlinear flow
Eyring–Powell fluid
geometrically three-dimensional flow
unsteady flow
global existence
Descripción
Sumario:The purpose of the present study is to obtain regularity results and existence topics regarding an Eyring–Powell fluid. The geometry under study is given by a semi-infinite conduct with a rectangular cross section of dimensions L×H. Starting from the initial velocity profiles (u01,u02) in xy-planes, the fluid flows along the z-axis subjected to a constant magnetic field and Dirichlet boundary conditions. The global existence is shown in different cases. First, the initial conditions are considered to be squared-integrable; this is the Lebesgue space (u01,u02)∈L2(Ω), Ω=[0,L]×[0,H]×(0,∞). Afterward, the results are extended for (u01,u02)∈Lp(Ω), p>2. Lastly, the existence criteria are obtained when (u01,u02)∈H1(Ω). A physical interpretation of the obtained bounds is provided, showing the rheological effects of shear thinningand shear thickening in Eyring–Powell fluids.