论文信息 - On multigrid methods for vector-valued Allen-Cahn equations

On multigrid methods for vector-valued Allen-Cahn equations

In this paper, we consider multicomponent phase transitions as described by a vector-valued Allen-Cahn equation with obstacle potential. Semi-implicit discretization in time is unconditionally stable but, after finite element discretization in space, leads to large non-smooth algebraic systems. So far, fast solvers for such kind of problems were not available. As a consequence, explicit schemes are applied, in spite of severe stability restrictions on the time step. We present a new class of multigrid methods based on successive minimization in the direction of well selected search directions and prove global convergence. Similar multigrid techniques have been applied in a different context. Numerical experiments illustrate the reliability and efficiency of our method

Ralf Kornhuber | Rolf Krause | R. Kornhuber | R. Krause

[1] Charles M. Elliott,et al. The Cahn–Hilliard gradient theory for phase separation with non-smooth free energy Part II: Numerical analysis , 1991, European Journal of Applied Mathematics.

[2] R. Glowinski,et al. Numerical Methods for Nonlinear Variational Problems , 1985 .

[3] R. Kornhuber. Adaptive monotone multigrid methods for nonlinear variational problems , 1997 .

[4] L. Bronsard,et al. On three-phase boundary motion and the singular limit of a vector-valued Ginzburg-Landau equation , 1993 .

[5] R. Kornhuber,et al. Adaptive multigrid methods for Signorini’s problem in linear elasticity , 2001 .

[6] R. Kornhuber. Monotone multigrid methods for elliptic variational inequalities I , 1994 .

[7] Harald Garcke,et al. Anisotropy in multi-phase systems: a phase field approach , 1999 .

[8] Harald Garcke,et al. On anisotropic order parameter models for multi-phase system and their sharp interface limits , 1998 .

[9] Jinchao Xu,et al. Iterative Methods by Space Decomposition and Subspace Correction , 1992, SIAM Rev..