光折变非相干耦合空间孤子族统一理论

吉选芒; 姜其畅; 刘劲松

doi:10.7498/aps.61.074205

摘要

理论证明了稳态条件下有分压电阻和e偏振非相干均匀背景光辐照的光伏光折变晶体中存在非相干耦合空间孤子族.这种孤子族是由多束偏振方向和波长都相同的互不相干光束耦合形成的.孤子族各分量成分光束都能在晶体中稳定传播.当入射光束中只含有一个或两个分量时,空间孤子族退化为空间孤子或非相干耦合孤子对.当分压电阻、e偏振背景光、外加电场和光伏场取不同值时,可获得14种光折变非相干耦合空间孤子族.先前已报道的非相干耦合空间孤子族都可在不同条件下从本文中得到.

关键词:

Abstract

The incoherently coupled soliton families are predicted in photovoltaic photorefractive crystals illuminated by E-polarized incoherent uniform back-ground irradiation with a divider resistance under steady-state conditions. These soliton families can be established provided that the incident optical beams share the same polarization and wavelength, and are mutually incoherent. When these incoherent coupled soliton families propagate together, all components can propagate stably in photorefractive crystal. Moreover, such soliton families reduce into spatial soliton or incoherently coupled soliton pairs when they contain only one or two components. The 14 kinds of incoherently coupled spatial soliton families can be obtained from this theory by adjusting the value of the divider resistance, E-polarized back-ground irradiation, the biased electric field and photovoltaic electric field. Previous theories advanced individually elsewhere for these soliton families can be obtained by simplifying this theory under appropriate conditions.

Keywords:

作者及机构信息

1.
山西运城学院物理与电子工程系, 运城 044000;

2.
华中科技大学光电子科学与工程学院, 武汉 430074

基金项目: 山西省自然科学基金(批准号:2011011003-2)和山西省高校科技研究开发项目(批准号:20111125)资助的课题.

Authors and contacts

1.
Department of Physics and Electronic Engineering, Yuncheng University, Yuncheng 044000, China;

2.
College of Optoelectronic Science and Engineering, Huazhong University of Science and Technology, WuHan 430074, China

Funds: Project supported by the Natural Science Foundation of Shanxi Province, China (Grant No.2011011003-2), and the Science and Technology Development Foundation of Higher Education of Shanxi Province, China (Grant No.20111125).

参考文献

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施引文献

[1]	Segev M,Crosignani B,Yariv A,Fischer B 1992 Phys.Rev.Lett.68 923
[2]	Duree G C,Shultz J L,Salamo G,Segev M,Yariv A,Crosignani B,Porto D P,Sharp E J,Neurgaonkar R R 1993 Phys.Rev.Lett.71 533
[3]	Valley G C,Segev M,Crosignani B,Yariv A,Fejer M M,Bashaw M C 1994 Phys.Rev.A 50 R4457
[4]	Taya M,Bashaw M,Fejer M M,Segev M,Valley G C 1995 Phys.Rev.A 52 3095
[5]	She W L,Lee W K 2001 Acta Phys.Sin.50 886 (in Chinese)[佘卫龙,李荣基 2001 物理学报 50 886]
[6]	Hou C F,Jiang Y Y,Tang R M,Yuan B H,Sun X D 2001 Journal of Optoelectronics Laser.12 410
[7]	Hou C F,Pei Y B,Zhou Z X,Sun X D 2005 Chin.Phys.14 349
[8]	Christodoulides D N,Carvalho M I 1995 J.Opt.Soc.Am.B 12 1628
[9]	Shih MF,Segev M,Valley G C,Salamo G,Grosignani B,Di Porto P 1995 Electron.Lett.31 826
[10]	Christodoulides D N,Singh S R,Carvalho M I,Segev M 1996 Appl.Phys.Lett.68 1763
[11]	Liu J S,Lu K Q 1998 Acta Phys.Sin.47 1059 (in Chinese)[刘劲松,卢克清 1998 物理学报 47 1509]
[12]	Liu J S,Lu K Q 1999 J.Opt.Soc.Am.B 16 550
[13]	Hou C F,Li Y,Zhang X F,Yuan B H,Sun X D 2000 Opt.Commun.181 141
[14]	Liu J S 2001 Chin.Phys.10 1037
[15]	Ji X M,Jiang Q C,Wang J L,Liu J S 2010 Acta Photonica Sin.39 1867
[16]	Hou C,Zhou Z,Yuan B,Sun X 2001 Appl.Phys.B 72 191
[17]	Hou C F,Li B,Sun X D 2001 Chin.Phys.10 310
[18]	Hou C F,Pei Y B,Zhou Z X,Sun X D 2005 Phys.Rev.A 71 053871
[19]	Zhang Y,Hou C F,Sun X D 2007 Chin.Phys.16 159
[20]	Zhang G Y,Liu J S 2009 J.Opt.Soc.Am.B 26 113
[21]	Ji X M,Ji Q C,Liu J S 2011 Acta Phys.Sin.60 034212 (in Chinese)[吉选芒,姜其畅,刘劲松 2011 物理学报 {bf 60 034212]
[22]	Kukhtarev N V,Markov V B,Odulov S G,Soskin M S,Vinestkii V L 1979 Ferroelectric.22 949

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