Affiliation:
1. Institut für Mathematik MA4-5, Technische Universität Berlin, Str. des 17. Juni 136, 10623Berlin, Germany
Abstract
AbstractThe dynamics of elastic media, constrained by Dirichlet boundary conditions, can be modeled as an operator DAE of semi-explicit structure. These models include flexible multibody systems as well as applications with boundary control. In order to use adaptive methods in space, we analyze the properties of the Rothe method concerning stability and convergence for this kind of systems. We consider a regularization of the operator DAE and prove the weak convergence of the implicit Euler scheme. Furthermore, we consider perturbations in the semi-discrete systems which correspond to additional errors such as spatial discretization errors.
Subject
Applied Mathematics,Computational Mathematics,Numerical Analysis
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