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Stationary Solitons of the Fifth Order KdV-type Equations and their Stabilization

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arxiv hep-th/9604122 v1 pith:6Q4TPOPG submitted 1996-04-19 hep-th cond-matnlin.SIsolv-int

Stationary Solitons of the Fifth Order KdV-type Equations and their Stabilization

classification hep-th cond-matnlin.SIsolv-int
keywords betagammaalphasolitonsolitonssolutionsstationarycase
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Exact stationary soliton solutions of the fifth order KdV type equation $$ u_t +\alpha u^p u_x +\beta u_{3x}+\gamma u_{5x} = 0$$ are obtained for any p ($>0$) in case $\alpha\beta>0$, $D\beta>0$, $\beta\gamma<0$ (where D is the soliton velocity), and it is shown that these solutions are unstable with respect to small perturbations in case $p\geq 5$. Various properties of these solutions are discussed. In particular, it is shown that for any p, these solitons are lower and narrower than the corresponding $\gamma = 0$ solitons. Finally, for p = 2 we obtain an exact stationary soliton solution even when $D,\alpha,\beta,\gamma$ are all $>0$ and discuss its various properties.

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