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Hard clamped and hard simply supported elastic plate is considered. The mixed finite element analysis combined with some interpolation, proposed by Brezzi, Fortin and Stenberg, is extended to the case of variable thickness and anisotropic material.
The contribution is devoted to computations of the limit load for a perfectly plastic model with the von Mises yield criterion. The limit factor of a prescribed load is defined by a specific variational problem, the so-called limit analysis problem. This problem is solved in terms of deformation fields by a penalization, the finite element and the semismooth Newton methods. From the numerical solution, we derive a guaranteed upper bound of the limit factor. To achieve more accurate results, a local...
This paper is concerned with the unilateral contact problem
in linear elasticity. We define two a posteriori error estimators of residual type
to evaluate the accuracy of the mixed finite element approximation of the contact problem.
Upper and lower bounds of the discretization error are proved for
both estimators and several computations are performed to
illustrate the theoretical results.
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