Dromion-like structures and periodic wave solutions for variable-coefficients complex cubic-quintic Ginzburg-Landau equation influenced by higher-order effects and nonlinear gain

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Dromion-like structures and periodic wave solutions for variable-coefficients complex cubic-quintic Ginzburg-Landau equation influenced by higher-order effects and nonlinear gain

机译：由高阶效应和非线性增益影响的可变系数复杂立方 - 五通吉兹堡 - Landau方程的Dromion的结构和周期波解

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In this work, the variable-coefficients complex cubic-quintic Ginzburg-Landau equation (CCQGLE) influenced by higher-order effects and nonlinear gain is considered. Based on the asymmetric method, analytic one-soliton solution for the variable-coefficients CCQGLE is constructed for the first time. In addition, with some certain conditions, the periodic wave and dromion-like structures are derived. The results obtained may be helpful in understanding the solitons amplification and solitons management in optical fiber.

机译：在这项工作中，考虑了受高阶效应和非线性增益影响的可变系数复杂的立方 - 五通吉他 - Landau方程（CC卡）。基于非对称方法，第一次构建用于可变系数CC卡的分析单孤子解决方案。另外，通过一些条件，衍生周期性波和润滑性的结构。获得的结果可能有助于理解光纤中的孤子扩增和孤子管理。

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《Nonlinear dynamics》 |2020年第2期|共7页
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正文语种 eng
中图分类动力学;
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Solitons; Variable-coefficients Ginzburg-Landau equation; Dromion-like structures; Periodic wave solutions; Asymmetric method;

机译：孤子;可变系数Ginzburg-Landau方程;像罗马类似的结构;周期性波解;不对称方法;

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1. Dromion-like structures and periodic wave solutions for variable-coefficients complex cubic-quintic Ginzburg-Landau equation influenced by higher-order effects and nonlinear gain [J] . Nonlinear dynamics . 2020,第2期

机译：由高阶效应和非线性增益影响的可变系数复杂立方 - 五通吉兹堡 - Landau方程的Dromion的结构和周期波解
2. Stable transmission of solitons in the complex cubic-quintic Ginzburg-Landau equation with nonlinear gain and higher-order effects [J] . Yan Yuanyuan, Liu Wenjun Applied mathematics letters . 2019,第期

机译：具有非线性增益和高阶效应的复杂立方 - 五通吉堡 - Landau方程中孤子稳定的传播
3. An investigation of abundant traveling wave solutions of complex nonlinear evolution equations: The perturbed nonlinear Schrodinger equation and the cubic-quintic Ginzburg-Landau equation [J] . Md. Mamun Miah, H.M. Shahadat Ali, M. Ali Akbar Cogent Mathematics & Statistics . 2016,第1期

机译：复杂非线性发展方程丰富行波解的研究：摄动非线性Schrodinger方程和三次三次Ginzburg-Landau方程
4. Transition of Stationary to Pulsating Solutions in the Complex Cubic-quintic Ginzburg-Landau Equation in the Presence of Intrapulse Raman Scattering and Self-Steepening Under the Influence of Nonlinear Gain [C] . Ivan M. Uzunov, Todor N. Arabadzhiev, Zhivko D. Georgiev Jubilee International Conference of the Balkan Physical Union . 2019

机译：在非线性增益影响下，在网上立方 - 吉丁堡 - 陆地方程中静止对脉动解决方案的转变，在非线性增益影响下自我沉降
5. Dissipative solitons in the cubic-quintic complex Ginzburg-Landau equation: Bifurcations and spatiotemporal structure. [D] . Mancas, Ciprian Stefan. 2007

机译：三次三次复数Ginzburg-Landau方程中的耗散孤子：分叉和时空结构。
6. Resonant Drift of Spiral Waves in the Complex Ginzburg-Landau Equation [O] . Irina V. Biktasheva, Yury E. Elkin, Vadim N. Biktashev 1999

机译：复数Ginzburg-Landau方程中螺旋波的共振漂移
7. Bifurcations and Competing Coherent Structures in the Cubic-Quintic Ginzburg-Landau Equation I: Plane Wave (CW) Solutions [O] . Stefan C. Mancas, S. Roy Choudhury 2016

机译：立方 - 五阶Ginzburg-Landau方程I中的分叉和竞争相干结构：平面波（CW）解

Dromion-like structures and periodic wave solutions for variable-coefficients complex cubic-quintic Ginzburg-Landau equation influenced by higher-order effects and nonlinear gain

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