Unified Theory of Ghost and Quadratic-Flux-Minimizing Surfaces

Abstract

A generalized Hamiltonian definition of ghost surfaces (surfaces defined by an action-gradient flow) is given and specialized to the usual Lagrangian definition. Numerical calculations show uncorrected quadratic-flux-minimizing (QFMin) and Lagrangian ghost surfaces give very similar results for a chaotic magnetic field weakly perturbed from an integrable case in action-angle coordinates, described by L = L0 + ε L1, where L0(θ) (with θ denoting dθ/dζ) is an integrable field-line Lagrangian and ε is a perturbation parameter. This is explained using a perturbative construction of the auxiliary poloidal angle that corrects QFMin surfaces so they are also ghost surfaces. The difference between the corrected and uncorrected surfaces is O(ε2), explaining the observed smallness of this difference. An alternative definition of ghost surfaces is also introduced, based on an action-gradient flow in , which appears to have superior properties when unified with QFMin surfaces.