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Parametric excitation of drift waves in a sheared slab geometry

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Abstract

The threshold for parametric excitation of drift waves in a sheared slab geometry is calculated for a pump wave that is a standing wave along the magnetic field, using the Hasegawa-Mima nonlinearity. The shear damping is counteracted by the parametric coupling and the eigenvalue problem is solved analytically using Taylor`s strong coupling approximation. (au).
Authors:
Publication Date:
Dec 31, 1992
Product Type:
Technical Report
Report Number:
CTH-IEFT-PP-1992-19
Reference Number:
SCA: 700340; PA: AIX-24:025252; SN: 93000948455
Resource Relation:
Other Information: PBD: [1992]
Subject:
70 PLASMA PHYSICS AND FUSION TECHNOLOGY; PLASMA WAVES; PARAMETRIC INSTABILITIES; EIGENVALUES; FREQUENCY MIXING; INHOMOGENEOUS PLASMA; NONLINEAR PROBLEMS; PLASMA DRIFT; 700340; PLASMA WAVES, OSCILLATIONS, AND INSTABILITIES
OSTI ID:
10128035
Research Organizations:
Chalmers Univ. of Technology, Goeteborg (Sweden). Inst. for Electromagnetic Field Theory and Plasma Physics
Country of Origin:
Sweden
Language:
English
Other Identifying Numbers:
Other: ON: DE93617839; TRN: SE9200369025252
Availability:
OSTI; NTIS; INIS
Submitting Site:
SWDN
Size:
[14] p.
Announcement Date:
Jul 04, 2005

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Citation Formats

Vranjes, J, and Weiland, J. Parametric excitation of drift waves in a sheared slab geometry. Sweden: N. p., 1992. Web.
Vranjes, J, & Weiland, J. Parametric excitation of drift waves in a sheared slab geometry. Sweden.
Vranjes, J, and Weiland, J. 1992. "Parametric excitation of drift waves in a sheared slab geometry." Sweden.
@misc{etde_10128035,
title = {Parametric excitation of drift waves in a sheared slab geometry}
 author = {Vranjes, J, and Weiland, J}
 abstractNote = {The threshold for parametric excitation of drift waves in a sheared slab geometry is calculated for a pump wave that is a standing wave along the magnetic field, using the Hasegawa-Mima nonlinearity. The shear damping is counteracted by the parametric coupling and the eigenvalue problem is solved analytically using Taylor`s strong coupling approximation. (au).}
 place = {Sweden}
 year = {1992}
 month = {Dec}
 }