A parallel cut-cell algorithm for the free-boundary Grad-Shafranov problem
Shuang Liu
UCSD
Abstract:
A parallel cut-cell algorithm is described to solve the free boundary problem of the Grad-Shafranov equation.
The algorithm reformulates the free-boundary problem in an irregular bounded domain and its important aspects include a
searching algorithm for the magnetic axis and separatrix, a surface integral along the irregular boundary to determine the
boundary values, an approach to optimize the coil current based on a targeting plasma shape, Picard iterations with Aitken's
acceleration for the resulting nonlinear problem and a Cartesian grid embedded boundary method to handle the complex
geometry. The algorithm is implemented in parallel using a standard domain-decomposition approach and a good parallel
scaling is observed. Numerical results verify the accuracy and efficiency of the free-boundary Grad-Shafranov solver.
Tuesday, April 27, 2021
11:00AM Zoom ID 939 3177 8552