Characteristics of monotonic sheaths near a wall with grazing magnetic incidence

Abstract

We consider a magnetised plasma in contact with an absorbing planar wall, where the angle α between the magnetic field and the wall is small, α 1 (in radians) and the system is symmetric tangential to the wall. The finite ratio γ of the characteristic electron gyroradius e to the Debye length λ D, γ = e / λ D, is retained via a grazing-incidence (α 1) gyrokinetic treatment [1,2]. Building on a previously developed iterative scheme [2,3] to solve for the steady-state electrostatic potential in the quasineutral magnetic presheath of width S, we developed a scheme that simultaneously solves for both the presheath and the non-neutral Debye sheath of width λ D in the limit λ D / S → 0. The code, called GYRAZE, thus provides the energy-angle distribution of ions at the wall and the velocity distributions of electrons reflected by the wall for different values of wall potential. A monotonic electrostatic potential profile, assumed in this work, can only exist for magnetic field angles larger than a critical value [3]. While the critical angle is shown here to significantly increase with γ, it is still typically smaller than the magnetic field angle at divertor targets of a fusion device.