Abstract:
The penalty method for mixed finite element methods is formulated and studied. The Herrmann–Miyoshi
scheme for the biharmonic equation is considered. The main idea is to construct a perturbation problem with
two parameters that play the role of penalties. The perturbation problem is constructed by substitution of
the main conditions in the mixed variational formulation on the interface by natural conditions that contain
parameters. The discretization of the perturbation problem by the finite element method is done. Estimates of
the norm of a difference between the solution of a discrete perturbation problem and that of a given problem
are obtained. Recommendations for choosing penalties depending on a mesh size and penalties are given.
Key words:mixed scheme, grids matching, the penalty method, loss in convergence rate.
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