Artículo
Recursive POD expansion for reaction-diffusion equation
Autor/es | Azaïez, Majdi
Ben Belgacem, Faker Chacón Rebollo, Tomás |
Departamento | Universidad de Sevilla. Departamento de Ecuaciones Diferenciales y Análisis Numérico |
Fecha de publicación | 2016-12 |
Fecha de depósito | 2017-01-19 |
Publicado en |
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Resumen | This paper focuses on the low-dimensional representation of multivariate functions. We study a recursive POD representation, based upon the use of the power iterate algorithm to recursively expand the modes retained in the ... This paper focuses on the low-dimensional representation of multivariate functions. We study a recursive POD representation, based upon the use of the power iterate algorithm to recursively expand the modes retained in the previous step. We obtain general error estimates for the truncated expansion, and prove that the recursive POD representation provides a quasi-optimal approximation in L2 norm. We also prove an exponential rate of convergence, when applied to the solution of the reaction-diffusion partial differential equation. Some relevant numerical experiments show that the recursive POD is computationally more accurate than the Proper Generalized Decomposition for multivariate functions. We also recover the theoretical exponential convergence rate for the solution of the reaction-diffusion equation. |
Cita | Azaïez, M., Ben Belgacem, F. y Chacón Rebollo, T. (2016). Recursive POD expansion for reaction-diffusion equation. Advanced Modeling and Simulation in Engineering Sciences, 3 (3), 1-22. |
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