G. A. Rudykh, A. V. Sinitsyn, “Solvability of nonlinear boundary-value problems arising in modeling plasma diffusion across a magnetic field and its equilibrium configurations”, Mat. Zametki, 77:2 (2005), 219–234; Math. Notes, 77:2 (2005), 199

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Matematicheskie Zametki, 2005, Volume 77, Issue 2, Pages 219–234
DOI: https://doi.org/10.4213/mzm2486 (Mi mzm2486)

Solvability of nonlinear boundary-value problems arising in modeling plasma diffusion across a magnetic field and its equilibrium configurations

G. A. Rudykh, A. V. Sinitsyn

Institute of System Dynamics and Control Theory, Siberian Branch of the Russian Academy of Sciences

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DOI: https://doi.org/10.4213/mzm2486

Abstract: We study the simplest one-dimensional model of plasma density balance in a tokamak type system, which can be reduced to an initial boundary-value problem for a second-order parabolic equation with implicit degeneration containing nonlocal (integral) operators. The problem of stabilizing nonstationary solutions to stationary ones is reduced to studying the solvability of a nonlinear integro-differential boundary-value problem. We obtain sufficient conditions for the parameters of this boundary-value problem to provide the existence and the uniqueness of a classical stationary solution, and for this solution we obtain the attraction domain by a constructive method.

Received: 21.08.2002
Revised: 10.11.2003

English version:
Mathematical Notes, 2005, Volume 77, Issue 2, Pages 199–212
DOI: https://doi.org/10.1007/s11006-005-0021-3

Bibliographic databases:

UDC: 517.946

Language: Russian

Citation: G. A. Rudykh, A. V. Sinitsyn, “Solvability of nonlinear boundary-value problems arising in modeling plasma diffusion across a magnetic field and its equilibrium configurations”, Mat. Zametki, 77:2 (2005), 219–234; Math. Notes, 77:2 (2005), 199–212

Citation in format AMSBIB

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