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Hamiltonian formulations of quasilinear theory for magnetized plasmas

Alain J. Brizard, A. A. Chan

2022Frontiers in Astronomy and Space Sciences12 citationsDOIOpen Access PDF

Abstract

Hamiltonian formulations of quasilinear theory are presented for the cases of uniform and nonuniform magnetized plasmas. First, the standard quasilinear theory of Kennel and Engelmann (Kennel, Phys. Fluids, 1966, 9, 2377) is reviewed and reinterpreted in terms of a general Hamiltonian formulation. Within this Hamiltonian representation, we present the transition from two-dimensional quasilinear diffusion in a spatially uniform magnetized background plasma to three-dimensional quasilinear diffusion in a spatially nonuniform magnetized background plasma based on our previous work (Brizard and Chan, Phys. Plasmas, 2001, 8, 4762–4771; Brizard and Chan, Phys. Plasmas, 2004, 11, 4220–4229). The resulting quasilinear theory for nonuniform magnetized plasmas yields a 3 × 3 diffusion tensor that naturally incorporates quasilinear radial diffusion as well as its synergistic connections to diffusion in two-dimensional invariant velocity space (e.g., energy and pitch angle).

Topics & Concepts

PhysicsPlasmaHamiltonian (control theory)DiffusionQuantum electrodynamicsClassical mechanicsPlasma diffusionMathematical physicsQuantum mechanicsMathematicsMathematical optimizationSolar and Space Plasma DynamicsIonosphere and magnetosphere dynamicsMagnetic confinement fusion research
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