Ponencia
Time-periodic solutions for a generalized Boussinesq model with Neumann boundary conditions for temperature
Autor/es | Climent Ezquerra, María Blanca
Guillén González, Francisco Manuel Rojas Medar, Marko Antonio |
Departamento | Universidad de Sevilla. Departamento de Ecuaciones Diferenciales y Análisis Numérico |
Fecha de publicación | 2007-09 |
Fecha de depósito | 2015-09-11 |
Publicado en |
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ISBN/ISSN | 1364-5021 |
Resumen | The aim of this work is to prove the existence of regular time-periodic solutions for a generalized Boussinesq model (with nonlinear diffusion for the equations of velocity and temperature). The main idea is to obtain ... The aim of this work is to prove the existence of regular time-periodic solutions for a generalized Boussinesq model (with nonlinear diffusion for the equations of velocity and temperature). The main idea is to obtain higher regularity (of H3 type) for temperature than for velocity (of H2 type), using specifically the Neumann boundary condition for temperature. In fact, the case of Dirichlet condition for temperature remains as an open problem. |
Identificador del proyecto | BFM2003-06446-C02-01
PHB2005-0042 301354/03-0 |
Cita | Climent Ezquerra, M.B., Guillén González, F.M. y Rojas Medar, M.A. (2007). Time-periodic solutions for a generalized Boussinesq model with Neumann boundary conditions for temperature. Royal Society of London. |
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