Publication Date:
2021-11-16
Description:
Multigrid methods for two-body contact problems are mostly
based on special mortar discretizations, nonlinear Gauss-Seidel
solvers, and solution-adapted coarse grid spaces. Their high
computational efficiency comes at the cost of a complex implementation
and a nonsymmetric master-slave discretization of the nonpenetration
condition. Here we investigate an alternative symmetric and
overconstrained segment-to-segment contact formulation that
allows for a simple implementation based on standard multigrid and
a symmetric treatment of contact boundaries, but leads to nonunique
multipliers. For the solution of the arising quadratic programs,
we propose augmented Lagrangian multigrid with overlapping block
Gauss-Seidel smoothers. Approximation and convergence properties are studied numerically at standard test problems.
Language:
English
Type:
conferenceobject
,
doc-type:conferenceObject