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Finite Element Convergence for the Joule Heating Problem with Mixed Boundary Conditions

We prove strong convergence of conforming finite element approximations to the stationary Joule heating problem with mixed boundary conditions on Lipschitz domains in three spatial dimensions. We show optimal global regularity estimates on creased domains and prove a priori and a posteriori bounds for shape regular meshes.

preprint2012arXivOpen access

Max Jensen Axel Målqvist

math.NA

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Max Jensen Axel Målqvist

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Finite Element Convergence for the Joule Heating Problem with Mixed Boundary Conditions

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