A Variational Framework for Guiding-Center Kinetics, Anisotropic Equilibria, and Quasisymmetry in Stellarators

Abstract

We present a variational framework in which (i) guiding-center kinetic theory, (ii) macroscopic force balance with gyrotropic/anisotropic pressure, and (iii) quasisymmetry (QS) constraints appear as different facets of a single structure. Starting from a guiding-center Vlasov--Maxwell action, constrained variations yield the guiding-center kinetic equation and Maxwell equations. Without phenomenological closure, momentum conservation yields macroscopic force balance J × B/c = ∇·Π, where J is the current density, B is the magnetic field, and Π is the gyrotropic stress tensor. We connect QS to an integrability condition expressed in coordinate-free form via fT ∇ψ· (∇ B × ∇(B · ∇ B)) = 0, where ψ is the flux surface label, and show how this condition leads to solvability constraints on anisotropy closely related to those found in a recent constrained Kruskal--Kulsrud variational formulation.

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