An optimal linear solver for the Jacobian system of the extreme type-II Ginzburg–Landau problem

This paper considers the extreme type-II Ginzburg–Landau equations, a nonlinear PDE model for describing the states of a wide range of superconductors. Based on properties of the Jacobian operator and an AMG strategy, a preconditioned Newton–Krylov method is constructed. After a finite-volume-type discretization, numerical experiments are done for representative two- and three-dimensional domains. Strong numerical evidence is provided that the number of Krylov iterations is independent of the dimension n   of the solution space, yielding an overall solver complexity of O(n)O(n).