Nonlinear evolution of the double tearing instability

Berroukeche, M; Maschke, E K; Saramito, B

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Nonlinear evolution of the double tearing instability

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Abstract

A systematic numerical study of the nonlinear saturation of double tearing modes has revealed the existence of oscillatory solutions which bifurcate from a stationary nonlinear solution. (author) 15 refs.

Authors:

Berroukeche, M; Maschke, E K; ^[1] Saramito, B ^[2]

Association Euratom-CEA Cadarache, 13 - Saint-Paul-lez-Durance (France). Dept. de Recherches sur la Fusion Controlee
Clermont-Ferrand-2 Univ. Blaise Pascal, 63 - Aubiere (France). Dept. de Mathematique Appliquee

Publication Date:

Jan 01, 1998

Product Type:

Technical Report

Report Number:

EUR-CEA-FC-1620

Reference Number:

SCA: 700340; PA: AIX-30:035080; EDB-99:083290; SN: 99002122276

Resource Relation:

Other Information: DN: 15 refs.; PBD: Jan 1998

Subject:

70 PLASMA PHYSICS AND FUSION TECHNOLOGY; BIFURCATION; MHD EQUILIBRIUM; PLASMA FLUID EQUATIONS; PLASMA SIMULATION; TEARING INSTABILITY; 700340; PLASMA WAVES, OSCILLATIONS, AND INSTABILITIES

OSTI ID:

10147078

Research Organizations:

Association Euratom-CEA Cadarache, 13 - Saint-Paul-lez-Durance (France). Dept. de Recherches sur la Fusion Controlee

Country of Origin:

France

Language:

English

Other Identifying Numbers:

Other: ON: TI99627798; TRN: FR9805517035080

Availability:

OSTI; NTIS (US Sales Only); INIS

Submitting Site:

FRN

Size:

25 p.

Announcement Date:

Sep 07, 1999

Citation Formats

Berroukeche, M, Maschke, E K, and Saramito, B. Nonlinear evolution of the double tearing instability. France: N. p., 1998. Web.

Berroukeche, M, Maschke, E K, & Saramito, B. Nonlinear evolution of the double tearing instability. France.

Berroukeche, M, Maschke, E K, and Saramito, B. 1998. "Nonlinear evolution of the double tearing instability." France.

@misc{etde_10147078,
title = {Nonlinear evolution of the double tearing instability}
author = {Berroukeche, M, Maschke, E K, and Saramito, B}
abstractNote = {A systematic numerical study of the nonlinear saturation of double tearing modes has revealed the existence of oscillatory solutions which bifurcate from a stationary nonlinear solution. (author) 15 refs.}
place = {France}
year = {1998}
month = {Jan}
}

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