Artículo
Convergence and error estimates of two iterative methods for the strong solution of the incompressible korteweg model
Autor/es | Guillén González, Francisco Manuel
Rodríguez Bellido, María Ángeles |
Departamento | Universidad de Sevilla. Departamento de Ecuaciones Diferenciales y Análisis Numérico |
Fecha de publicación | 2009-09 |
Fecha de depósito | 2016-04-22 |
Publicado en |
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Resumen | We show the existence of strong solutions for a fluid model with Korteweg tensor, which is obtained as limit of two iterative linear schemes. The different unknowns are sequentially decoupled in the first scheme and in ... We show the existence of strong solutions for a fluid model with Korteweg tensor, which is obtained as limit of two iterative linear schemes. The different unknowns are sequentially decoupled in the first scheme and in parallel form in the second one. In both cases, the whole sequences are bounded in strong norms and convergent towards the strong solution of the system, by using a generalization of the Banach’s Fixed Point Theorem. Moreover, we explicit a priori and a posteriori error estimates (respect to the weak norms), which let us to compare both schemes. |
Agencias financiadoras | Ministerio de Educación y Ciencia (MEC). España Junta de Andalucía |
Identificador del proyecto | MTM2006–07932
P06-FQM-02373 |
Cita | Guillén González, F.M. y Rodríguez Bellido, M.Á. (2009). Convergence and error estimates of two iterative methods for the strong solution of the incompressible korteweg model. Mathematical models and methods in applied sciences, 19 (9), 1713-1742. |
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