Open AccessUniversal Geometric Condition for the Transverse Instability of Solitary Waves
Author(s) -
Thomas J. Bridges
Publication year - 2000
Publication title -
physical review letters
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 3.688
H-Index - 673
eISSN - 1079-7114
pISSN - 0031-9007
DOI - 10.1103/physrevlett.84.2614
Subject(s) - physics , transverse plane , instability , classical mechanics , class (philosophy) , transverse wave , space (punctuation) , mathematical analysis , wave propagation , mechanics , mathematics , quantum mechanics , computer science , structural engineering , artificial intelligence , engineering , operating system
Transverse instabilities correspond to a class of perturbations traveling in a direction transverse to the direction of the basic solitary wave. Solitary waves traveling in one space direction generally come in one-parameter families. We embed them in a two-parameter family and deduce a new geometric condition for transverse instability of solitary waves. This condition is universal in the sense that it does not require explicit properties of the solitary wave-or the governing equation. In this paper the basic idea is presented and applied to the Zakharov-Kuznetsov equation for illustration. An indication of how the theory applies to a large class of equations in physics and oceanography is also discussed.
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