The content introduces a phase-field fracture model formulated as a constrained variational inequality system. To solve this nonlinear problem, a combined Newton-type algorithm with a primal-dual active set method is employed.
The key contribution is the development of a matrix-free geometric multigrid preconditioner for the inner linear GMRES solver. This preconditioner leverages a Chebyshev-Jacobi smoother and exploits the matrix-free framework to reduce memory consumption. The preconditioner is designed to handle the constraints arising from the phase-field model, including boundary conditions, active set constraints, and hanging node constraints from local mesh refinement.
The proposed numerical solver is applied to the Sneddon benchmark problem for phase-field fracture. The results demonstrate the efficiency of the matrix-free geometric multigrid preconditioner, with the numerical solution converging to the reference solution under grid refinement.
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