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dc.contributor.advisorGudi, Thirupathi
dc.contributor.advisorNandakumaran, A K
dc.contributor.authorChowdhury, Sudipto
dc.date.accessioned2018-06-18T09:53:34Z
dc.date.accessioned2018-07-31T06:09:23Z
dc.date.available2018-06-18T09:53:34Z
dc.date.available2018-07-31T06:09:23Z
dc.date.issued2018-06-18
dc.date.submitted2016
dc.identifier.urihttps://etd.iisc.ac.in/handle/2005/3717
dc.identifier.abstracthttp://etd.iisc.ac.in/static/etd/abstracts/4587/G27767-Abs.PDFen_US
dc.description.abstractThe primary goal of this thesis is to study finite element based a priori and a posteriori error estimates of optimal control problems of various kinds governed by linear elliptic PDEs (partial differential equations) of second and fourth orders. This thesis studies interior and boundary control (Neumann and Dirichlet) problems. The initial chapter is introductory in nature. Some preliminary and fundamental results of finite element methods and optimal control problems which play key roles for the subsequent analysis are reviewed in this chapter. This is followed by a brief literature survey of the finite element based numerical analysis of PDE constrained optimal control problems. We conclude the chapter with a discussion on the outline of the thesis. An abstract framework for the error analysis of discontinuous Galerkin methods for control constrained optimal control problems is developed in the second chapter. The analysis establishes the best approximation result from a priori analysis point of view and delivers a reliable and efficient a posteriori error estimator. The results are applicable to a variety of problems just under the minimal regularity possessed by the well-posedness of the problem. Subsequently, the applications of p p - interior penalty methods for a boundary control problem as well as a distributed control problem governed by the bi-harmonic equation subject to simply supported boundary conditions are discussed through the abstract analysis. In the third chapter, an alternative energy space based approach is proposed for the Dirichlet boundary control problem and then a finite element based numerical method is designed and analyzed for its numerical approximation. A priori error estimates of optimal order in the energy norm and the m norm are derived. Moreover, a reliable and efficient a posteriori error estimator is derived with the help an auxiliary problem. An energy space based Dirichlet boundary control problem governed by bi-harmonic equation is investigated and subsequently a l y - interior penalty method is proposed and analyzed for it in the fourth chapter. An optimal order a priori error estimate is derived under the minimal regularity conditions. The abstract error estimate guarantees optimal order of convergence whenever the solution has minimum regularity. Further an optimal order l l norm error estimate is derived. The fifth chapter studies a super convergence result for the optimal control of an interior control problem with Dirichlet cost functional and governed by second order linear elliptic PDE. An optimal order a priori error estimate is derived and subsequently a super convergence result for the optimal control is derived. A residual based reliable and efficient error estimators are derived in a posteriori error control for the optimal control. Numerical experiments illustrate the theoretical results at the end of every chapter. We conclude the thesis stating the possible extensions which can be made of the results presented in the thesis with some more problems of future interest in this direction.en_US
dc.language.isoen_USen_US
dc.relation.ispartofseriesG27767en_US
dc.subjectFinite Element Analysisen_US
dc.subjectBoundary Control Problemsen_US
dc.subjectNeumann Dirichlet Problemen_US
dc.subjectPartial Differential Equationen_US
dc.subjectOptimal Control Problemsen_US
dc.subjectDirichlet Boundary Controlen_US
dc.subjectDirichlet Optimal Control Problemen_US
dc.subjectDiscrete Dirichlet Control Problemen_US
dc.subject.classificationMathematicsen_US
dc.titleFinite Element Analysis of Interior and Boundary Control Problemsen_US
dc.typeThesisen_US
dc.degree.namePhDen_US
dc.degree.levelDoctoralen_US
dc.degree.disciplineFaculty of Scienceen_US


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