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高阶色散和指数饱和非线性光纤的调制不稳定性 被引量:3

Modulation instability in optical fiber with exponential saturable nonlinearity and high-order dispersion
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摘要 采用线性稳定性分析法,解析和计算了指数饱和非线性和高阶色散光纤中的调制不稳定条件和增益谱。结果表明:当二阶和四阶色散同为负时,随着参数的不同,增益谱可能只有一个谱区,也可能出现两个分离的谱区;当二阶和四阶色散分别为正和负时,无调制不稳定性;在其它色散区,则只有一个谱区。指数饱和非线性可能使各谱区的谱宽、峰值增益随入纤功率的增大呈现出先增大后减小的特点,即出现两个不同的输入功率对应同一个不稳定增益峰值和谱宽的情形。在其它参数相同时,指数饱和非线性下增益谱的谱宽和峰值增益随入纤功率的变化速度将比传统饱和非线性更快。 Utilizing the linear-stability analysis,the condition and gain spectra of modulation instability in optical fibers are investigated and calculated in case of exponential saturable nonlinearity and high-order dispersion.The results show that,when the fourth-order and the second-order dispersion are both negative,depending on different parameters,modulation instability may have only one spectral region or two separated spectral regions.When the second-order and fourth-order dispersions are respectively positive and negative,no modulation instability occurs.In the other dispersion regimes,the gain spectra consist of only one regime.The existence of the exponential saturable nonlinearity may make the spectral width as well as the peak gain of every spectral region increase with the input powers before decrease.That is to say,for every spectral region,this may lead to a unique value of peak gain and spectral width for two different input powers.In comparison with the case of conventional saturable nonlinearity,when the other parameters are the same,the variation of the spectral width as well as the peak gain with the input powers will be faster in case of exponential saturable nonlinearity.
作者 钟先琼 向安平
机构地区 成都信息工程学院光电技术学院
出处 《光学技术》 CAS CSCD 北大核心 2010年第2期274-278,共5页 Optical Technique
基金 四川省教育厅自然科学基金(2006A124)资助项目 四川省科技厅应用基础基金(05JY029-084)资助课题
关键词 非线性光学 调制不稳定性 指数饱和非线性 高阶色散 nonlinear optics modulation instability exponential saturable nonlinearity high-order dispersion
分类号 O437 [机械工程—光学工程]
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参考文献11

  • 1Kennedy R E, Popov S V, Tayor J R. Ytterbium gain band selfinduced modulation instability laser[J]. Opt Lett, 2006, 31 (2) : 167-168.
  • 2Demircan A, Bandelow U. Supercontinuum generation by the modulation instability [J]. Opt Commun, 2005, 244 (1-6): 181-185.
  • 3Lyra M L, Gouveia--Neto A S. Saturation effects on modulation instability in non-Kerr-like monomode optical fibers [J]. Opt Commun, 1994, 108: 117--120.
  • 4Adib B, Heidari A, Tayyari S F. An analytical approach to soliton of the saturable non-linear Scbrodinger equation determination and consideration of stability of solitary solutions of cubicquintic non-linear Schrodinger equation (CQNLSE) [J]. Corn mun Nonlinear Sci Numer Simulat, 2009, 14: 2034--2045.
  • 5Zhu S D. Exact solutions for the high-order dispersive cubicquintic nonlinear Schrodinger equation by the extended hyper bolic auxiliary equation method [J]. Chaos, Solitons and Fractals, 2007, 34:1608-1612.
  • 6Ndzana F II, Mohamadou A, Kofane T C. Modulational instability in the cubic - quintic nonlinear Schrodinger equation through the variational approach [J]. Opt Commun, 2007,275: 421--428.
  • 7Hong W P. Modulational instability of optical waves in the high dispersive cubic quintic nonlinear Schrodinger equation [J].Opt Commun, 2002, 213: 173--182.
  • 8Dalt N D, Angelis C D, Nalesso G F, et al. Dynamics of induced modulational instability in waveguides with saturable nonlinearity [J]. Opt Commun, 1995, 121:69-72.
  • 9Hickmann J M, Cavalcanti S B, Borges N M, et al. Modulational instability in semiconductor-doped glass fibers with saturable nonlinearity [J]. Opt Lett, 1993, 18(3): 182-184.
  • 10刘秀敏,杨性愉,王晶,冯启元.具有饱和非线性的非克尔光纤的调制不稳定性[J].光子学报,1998,27(1):41-45. 被引量:3

共引文献2

同被引文献22

  • 1钟先琼,陈建国,李大义,冯国英,欧群飞,陆丹.光纤中扰动的小信号增益[J].光学学报,2004,24(11):1521-1524. 被引量:3
  • 2钟先琼,陈建国,李大义.色散缓变光纤中五阶非线性调制不稳定性[J].激光技术,2006,30(1):27-30. 被引量:8
  • 3Agrawal G P,Baldeck P L,Alfano R R.Modulation instability in- duced by cross-phase modulation in optical fibers [J]. Plays Rev A, 1989, 39(7): 3406-3413.
  • 4Anderson D, Lisak M. Modulation instability of coherent optical fiber transmission signals [J]. Opt Lett, 1984, 9(10): 468-470.
  • 5Gorbach A V, Zhao X, Skryabin D V. Dispersion of nonlinearity and modulation instability in subwavelength semiconductor waveguides [J]. Opt Express, 2011, 19(10): 9345-9351.
  • 6Hickmann J M, Cavalcanti S B, Borges N M, et al. Modulational instability in semiconductor-doped glass fibers with saturable no- nlinearity [J]. Opt Lett, 1993, 18(3): 182.
  • 7Wamba E,Mohamadou A, Kofan6 T C. A variational approach to the modulational instability of a Bose-Einstein condensate in a parabolic trap [J]. J Phys B, 2008, 41: 225403.
  • 8Dianov E M, Mamyshev P V, Prokhorov A M, et al. Generation of a Train of Fundamental Solitons at a High Repetition Rate in Optical Fibers [ J ]. Optics Letters, 1989,14 ( 18 ) : 1008 - 1010.
  • 9Alcaraz-Pelegrina J M, Rodriguez-Garcla P. Modulational Instability in Two Cubic-quintic Ginzburg-Landau Equations Coupled with a Cross Phase Modulation Term[ J]. Physics Letters A,2010,374( 13 ) :1591 -1599.
  • 10Chow K W,Wong K K Y, Lain K. Modulation Instabilities in a System of Four Coupled Nonlinear Schrodinger Equations [ J ]. Physics Letters A ,2008,372 ( 25 ) :4596 - 4600.

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2010年 第2期

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