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Domain decomposition techniques provide a flexible tool for the numerical approximation of partial differential equations. Here, we consider mortar techniques for quadratic finite elements in 3D with different Lagrange multiplier spaces. In particular, we focus on Lagrange multiplier spaces which yield optimal discretization schemes and a locally supported basis for the associated constrained mortar spaces in case of hexahedral triangulations. As a result, standard efficient iterative solvers as...
Domain decomposition techniques provide a flexible tool for the numerical
approximation of partial differential equations. Here, we consider
mortar techniques for quadratic finite elements in 3D with
different Lagrange multiplier spaces.
In particular, we
focus on Lagrange multiplier spaces
which yield optimal discretization
schemes and a locally supported basis for the associated
constrained mortar spaces in case
of hexahedral triangulations. As a result,
standard efficient iterative solvers...
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