Two-component nonlinear waves

G. T. Adamashvili
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Abstract

The generalized equation for the study of two-component nonlinear waves in different fields of physics is considered. In special cases, this equation is reduced to a set of the various well-known equations describing nonlinear solitary waves in the different areas of physics. Using both the slowly varying envelope approximation and the generalized perturbation reduction method, the generalized equation is transformed into the coupled nonlinear Schrodinger equations and the two-component nonlinear solitary wave solution is obtained. Explicit analytical expressions for the shape and parameters of two-component nonlinear wave consisting of two breathers oscillating with the sum and difference frequencies and wave numbers are presented. The solution of the generalized equation coincides with the vector 0\pi pulse of the self-induced transparency.
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双分量非线性波
本研究考虑了研究物理学不同领域的双分量非线性波的广义方程。在特殊情况下,该方程被还原为物理学不同领域中描述非线性孤立波的各种著名方程组。利用缓变包络近似法和广义扰动还原法,将广义方程转化为耦合非线性施罗丁方程,并得到双分量非线性孤波的解。广义方程的解与自诱导透明度的矢量 0pi 脉冲相吻合。
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