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A posteriori error estimates for elliptic problems with Dirac measure terms in weighted spaces

Juan Pablo AgnelliEduardo M. GarauPedro Morin — 2014

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

In this article we develop error estimates for second order linear elliptic problems with point sources in two- and three-dimensional domains. We prove a global upper bound and a local lower bound for the error measured in a weighted Sobolev space. The weight considered is a (positive) power of the distance to the support of the Dirac delta source term, and belongs to the Muckenhoupt’s class . The theory hinges on local approximation properties of either Clément or Scott–Zhang interpolation...

Adaptive finite element method for shape optimization

Pedro MorinRicardo H. NochettoMiguel S. PaulettiMarco Verani — 2012

ESAIM: Control, Optimisation and Calculus of Variations

We examine shape optimization problems in the context of inexact sequential quadratic programming. Inexactness is a consequence of using adaptive finite element methods (AFEM) to approximate the state and adjoint equations (the dual weighted residual method), update the boundary, and compute the geometric functional. We present a novel algorithm that equidistributes the errors due to shape optimization and discretization, thereby leading to coarse resolution in the early stages and fine resolution...

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