Scalarization of stationary semiclassical problems for systems of equations and its application in plasma physics


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Abstract

We propose a method for determining asymptotic solutions of stationary problems for pencils of differential (and pseudodifferential) operators whose symbol is a self-adjoint matrix. We show that in the case of constant multiplicity, the problem of constructing asymptotic solutions corresponding to a distinguished eigenvalue (called an effective Hamiltonian, term, or mode) reduces to studying objects related only to the determinant of the principal matrix symbol and the eigenvector corresponding to a given (numerical) value of this effective Hamiltonian. As an example, we show that stationary solutions can be effectively calculated in the problem of plasma motion in a tokamak.

About the authors

A. Yu. Anikin

Ishlinskii Institute for Problems in Mechanics; Moscow Institute of Physics and Technology; Bauman Moscow State Technical University

Author for correspondence.
Email: anikin83@inbox.ru
Russian Federation, Moscow; Dolgoprudny, Moscow Oblast; Moscow

S. Yu. Dobrokhotov

Ishlinskii Institute for Problems in Mechanics; Moscow Institute of Physics and Technology

Email: anikin83@inbox.ru
Russian Federation, Moscow; Dolgoprudny, Moscow Oblast

A. I. Klevin

Ishlinskii Institute for Problems in Mechanics; Moscow Institute of Physics and Technology

Email: anikin83@inbox.ru
Russian Federation, Moscow; Dolgoprudny, Moscow Oblast

B. Tirozzi

ENEA Centro Ricerch di Frascati

Email: anikin83@inbox.ru
Italy, Frascati (Roma)

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