Conceitos essenciais
Efficiently solve eddy current optimization problems using the SKPIK method.
Resumo
The SKPIK method efficiently solves discretized linear systems from eddy current optimal control problems. It constructs a low-rank matrix equation method based on a special splitting technique and the Krylov-plus-inverted-Krylov (KPIK) algorithm. The new method, named SKPIK, provides fast solutions for large and sparse systems while overcoming storage issues. Theoretical results on the existence of low-rank solutions are provided, along with numerical experiments comparing its performance to existing methods.
Estatísticas
The mass matrix M is symmetric positive definite.
The stiffness matrix K is SPSD.
Tolerance set to 10^-6 for all methods.
Citações
"The SKPIK method always performs the best, needing the least computing time."
"LRMINRES method seems more efficient than FMINRES for small dimensional problems."
"FMINRES method can solve optimization problems successfully for small dimensional problems."