Physics – Plasma Physics
Scientific paper
2011-02-02
Physics
Plasma Physics
40 pages, 7 figures, communicated
Scientific paper
A general theory for the existence of solitary wave and double layer at M= Mc has been discussed, where Mc is the lower bound of the Mach number M, i.e., solitary wave and/or double layer solutions of the well-known energy integral start to exist for M> Mc. Ten important theorems have been proved to confirm the existence of solitary wave and double layer at M = Mc. If V({\phi})({\equiv}V(M,{\phi})) denotes the Sagdeev potential with {\phi} is the perturbed field or perturbed dependent variable associated with the specific problem, V(M,{\phi}) is well defined as a real number for all M {\in} \mathcal{M} and for all {\phi} {\in} {\Phi}, and V(M,0)=V'(M,0)=V"(Mc,0)=0, V"'(Mc,0)<0 (V"'(Mc,0)>0), \deltaV/\deltaM < 0 for all M({\in} \mathcal{M}) > 0 and for all {\phi}({\in} {\Phi}) > 0 ({\phi}({\in}{\Phi}) < 0), where " '{\equiv} \delta/\delta{\phi} ", the main analytical results for the existence of solitary wave and double layer solution of the energy integral at M= Mc are as follows. Result-1: If there exists at least one value M0 of M such that the system supports positive (negative) potential solitary waves for all Mc
Bandyopadhyay Anup
Das Animesh
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