dc.creatorBarrios Faúndez, Tomás
dc.creatorBustinza, Rommel
dc.creatorGarcía, Galina C.
dc.creatorHernández, Erwin
dc.date2015-11-20T20:49:06Z
dc.date2015-11-20T20:49:06Z
dc.date2012
dc.identifierComputer Methods in Applied Mechanics and Engineering 237
dc.identifier0045-7825
dc.identifierhttp://repositoriodigital.ucsc.cl/handle/25022009/388
dc.descriptionArtículo de publicación ISI
dc.descriptionIn this paper we present an augmented mixed formulation applied to generalized Stokes problem and uses it as state equation in an optimal control problem. The augmented scheme is obtained adding suitable least squares terms to the corresponding velocity–pseudostress formulation of the generalized Stokes problem. To ensure the existence and uniqueness of solution, at continuous and discrete levels, we prove coerciveness of the corresponding augmented bilinear form, and using approximation properties of the respective discrete subspaces, we deduce the optimal rate of convergence. As by product, and considering the associated optimal control problem, we derive error estimates for the approximated control unknown. Finally, we present several numerical examples confirming the theoretical properties of this approach.
dc.languageen
dc.publisherElsevier
dc.rightsAtribucion-Nocomercial-SinDerivadas 3.0 Chile
dc.rightshttp://creativecommons.org/licenses/by-nc-nd/3.0/cl/
dc.sourcehttp://goo.gl/nr3G20
dc.subjectMixed finite element
dc.subjectaugmented formulation
dc.subjectgeneralized Stokes problem
dc.subjectoptimal control problem
dc.titleOn stabilized mixed methods for generalized Stokes problem based on the velocity–pseudostress formulation: A priori error estimates
dc.typeArticle


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