非线性光学中的暗孤子分子

徐丹红; 楼森岳

doi:10.7498/aps.69.20191347

摘要

孤子分子是当前非线性光学中的重要课题. 本文首先研究具有高阶色散和高阶非线性效应非线性光学模型中各种周期波(孤子晶格)的严格解, 及各种可能的单孤子解. 然后在一个可积的情况下, 利用推广的双线性形式, 给出多孤子解, 并从多孤子解的速度共振条件给出暗孤子分子的严格解析表达式. 对于本文给出模型的多暗孤子分子之间, 以及孤子分子和通常孤子之间的相互作用都是弹性的. 值得指出的是, 在不可积的情况下孤子分子也是可以存在的.

关键词:

Abstract

The study on soliton molecules is one of the important topics in nonlinear science especially in nonlinear optics. The bright soliton molecules have been experimentally observed in optics, however, the dark soliton molecules have not yet been experimentally observed. Theoretically, the soliton molecules have been found for some coupled nonlinear systems. Nevertheless, the soliton molecules have not been obtained for non-coupled single component nonlinear models. In this paper, we first study the exact periodic waves (soliton lattices) and solitary waves for a nonlinear nonintegrable optical model with second and third order dispersions and high order nonlinear effects including self-steeping, Raman scattering and nonlinear dispersion. Two types of dark soliton lattice and three types of soliton lattice are explicitly exhibited for general nonintegrable system. Five types of bright (with and without gray background), dark and gray solitons can be obtained from the limit cases of the modules of the soliton lattices. For an integrable case, using a novel generalized bilinear form of a single component nonlinear system, the multi-soliton solutions are obtained and expressed by a completely new form which are invariant under the full reversal transformations such as the parity, the time reversal, the charge conjugate and the field reversal. To find soliton molecules, a novel mechanism, the velocity resonant, is proposed. Starting from the multi-soliton solutions and using the velocity resonance mechanism, the analytical expression of the dark soliton molecules can be readily obtained. For the model given in this paper, the integrable higher order nonlinear Schrodinger equation, one can proved that the interactions among the dark soliton molecules and the usually solitons are elastic. It is worth pointing out that soliton molecules can also exist in the case of nonintegrable systems.

Keywords:

作者及机构信息

宁波大学物理科学与技术学院, 宁波　315211

通信作者: 楼森岳, lousenyue@nbu.edu.cn

基金项目: 国家自然科学基金(批准号: 11975131, 11435005)

Authors and contacts

School of Physical Science and Technology, Ningbo University, Ningbo 315211, China

Corresponding author: Lou Sen-Yue, lousenyue@nbu.edu.cn

Funds: National Natural Science Foundation of China (Nos. 11975131, 11435005)

文章全文 : translate this paragraph

参考文献

[1]	Kivshar Y S, Malomed B A 1989 Rev. Mod. Phys. 61 763 Google Scholar
[2]	Köttig F, Tani T, Travers J C, Russell P St J 2017 Phys. Rev. Lett. 118 263902 Google Scholar
[3]	Strogatz S 2001 Nature (London) 410 268 Google Scholar
[4]	Forte S 1992 Rev. Mod. Phys. 64 193 Google Scholar
[5]	Hertog T, Horowitz G T 2005 Phys. Rev. Lett. 94 221301 Google Scholar
[6]	Drummond P D, Kheruntsyan K V, He H 1998 Phys. Rev. Lett. 81 3055 Google Scholar
[7]	Lou S Y, Huang F 2017 Sci. Rep. 7 869 Google Scholar
[8]	Wright L G, Christodoulides D N, Wise F W 2017 Science 358 94 Google Scholar
[9]	Dudley J M, Dias F, Erkintalo M, Genty G 2014 Nat. Photonics 8 755 Google Scholar
[10]	Stratmann M, Pagel T, Mitschke F 2005 Phys. Rev. Lett. 95 143902 Google Scholar
[11]	Herink G, Kurtz F, Jalali B, Solli D R, Ropers C 2017 Science 356 50 Google Scholar
[12]	Liu X M, Yao X K, Cui Y D 2018 Phys. Rev. Lett. 121 023905 Google Scholar
[13]	徐中巍, 张祖兴 2013 物理学报 62 104210 Google Scholar Xu Z W, Zhang Z X, 2013 Acta Phys. Sin. 62 104210 Google Scholar
[14]	Sheppard A P, Kivshar Y S 1997 Phys. Rev. E 55 4773 Google Scholar
[15]	Lakomy K, Nath R, Santos L 2012 Phys. Rev. A 86 013610 Google Scholar
[16]	Lou S Y 2019 arxiv: 1909.03399 v1[nlin.SI]
[17]	Hirota R 1971 Phys. Rev. Lett., 27 1192 Google Scholar
[18]	Liu S J, Tang X Y, Lou S Y 2018 Chin. Phys. B 27 060201 Google Scholar
[19]	Ablowitz M J, Clarkson P A 1991 Solitons, Nonlinear Evolution Equations and Inverse Scattering (Cambridge: Cambridge University Press)
[20]	Li Y Q, Chen J C, Chen Y, Lou S Y 2014 Chin. Phys. Lett. 31 010201 Google Scholar
[21]	陈登远 2006 孤子引论 (北京: 科学出版社) 第14−42页 Chen D Y 2006 Introduction on Solitons (Beijing: China Science Publishing and Media Ltd) pp14−42
[22]	Lou S Y 2018 J. Math. Phys. 59 083507 Google Scholar
[23]	Sasa N, Satsuma J 1991 J. Phys. Soc. Jpn. 60 409 Google Scholar
[24]	Hirota R 1973 J. Math. Phys. 14 805 Google Scholar
[25]	Kaup D J, Newell A C 1978 J. Math. Phys. 19 798
[26]	楼森岳 2020 物理学报 69 010503 Google Scholar Lou S Y 2020 Acta Phys. Sin. 69 010503 Google Scholar

施引文献

图 1 由(15) 式描述的亮孤子晶格, 其中参数由(16)式给定

Fig. 1. Bright soliton lattice described by Eq.(15) with the parameter selected from Eq. (16)

下载: 全尺寸图片幻灯片

图 2 由(15)式描述的暗孤子晶格, 其中参数由 (17)式给定

Fig. 2. Dark soliton lattice described by Eq. (15) with the parameter selected from Eq. (17)

下载: 全尺寸图片幻灯片

图 3 由(18)式描述第二类亮孤子晶格, 其中参数由 (20)式给定

Fig. 3. Second type of bright soliton lattice described by Eq. (18) with the parameter selected from Eq. (20)

下载: 全尺寸图片幻灯片

图 4 第三类亮孤子晶格. 由(21)式描述, 其中参数由 (23)式给定

Fig. 4. Third type of bright soliton lattice described by Eq. (21) with the parameter selected from Eq. (23)

下载: 全尺寸图片幻灯片

图 5 第二类暗孤子晶格由(21)式描述, 其中参数由 (24)式给定

Fig. 5. Second type of dark soliton lattice described by Eq. (21) with the parameter selected from Eq. (24)

下载: 全尺寸图片幻灯片

图 6 由(25)式描述的暗孤子, 其中参数由 (26)式给定

Fig. 6. Dark soliton described by Eq. (25) with the parameter selected from Eq. (26)

下载: 全尺寸图片幻灯片

图 7 由(27)式描述的具有灰背景的亮孤子, 其中参数由 (29)式给定

Fig. 7. Bright soliton (with gray background) described by Eq. (27) with the parameter selected from Eq. (29)

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图 8 由(27)式描述的暗孤子, 其中参数由 (30)式给定

Fig. 8. Dark soliton described by Eq. (27) with the parameter selected from Eq. (30)

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图 9 (a)由(27)式描述的暗孤子分子的密度图; (b) 与(a)对应的立体图, 图中参数由 (31)式给定

Fig. 9. (a)Density plot of the dark soliton molecule described by Eq. (27) with the parameter selected from Eq. (31); (b) three dimensional plot related to Fig.(a)

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图 10 由(42)−(43)式描述的二暗孤子相互作用的密度图, 图中参数由 (44)式给定

Fig. 10. Density plot of the interaction between two dark solitons described by Eq. (42)and Eq. (43) with the parameter selected from Eq. (44)

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图 11 (a) 由(42)式和(43)式描述的暗孤子分子密度图, 图中参数由 (47)式给定; (b) 与图(a)对应的三维立体图

Fig. 11. (a) Density plot of the dark soliton molecule described by Eq. (42) and Eq.(43) with the parameter selected from Eq. (47); (b) three dimensional plot related to Fig. (a)

下载: 全尺寸图片幻灯片

图 12 由(34)式，(37)式和(38)式描述的暗孤子分子和暗孤子的弹性相互作用的密度图, 图中参数由 (49)式给定

Fig. 12. Density plot of the interaction between a dark soliton molecule and a dark soliton described by Eq. (34), Eq. (37) and Eq. (38) with the parameter selected from Eq. (49)

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图 13 由(34)式，(37)式和(38)式描述的二暗孤子分子的弹性相互作用的密度图, 图中参数由 (50)式给定

Fig. 13. Density plot of the interaction between two dark soliton molecules described by Eq. (34), Eq. (37) and Eq. (38) with the parameter selected from Eq. (50)

下载: 全尺寸图片幻灯片

[1]	Kivshar Y S, Malomed B A 1989 Rev. Mod. Phys. 61 763 Google Scholar
[2]	Köttig F, Tani T, Travers J C, Russell P St J 2017 Phys. Rev. Lett. 118 263902 Google Scholar
[3]	Strogatz S 2001 Nature (London) 410 268 Google Scholar
[4]	Forte S 1992 Rev. Mod. Phys. 64 193 Google Scholar
[5]	Hertog T, Horowitz G T 2005 Phys. Rev. Lett. 94 221301 Google Scholar
[6]	Drummond P D, Kheruntsyan K V, He H 1998 Phys. Rev. Lett. 81 3055 Google Scholar
[7]	Lou S Y, Huang F 2017 Sci. Rep. 7 869 Google Scholar
[8]	Wright L G, Christodoulides D N, Wise F W 2017 Science 358 94 Google Scholar
[9]	Dudley J M, Dias F, Erkintalo M, Genty G 2014 Nat. Photonics 8 755 Google Scholar
[10]	Stratmann M, Pagel T, Mitschke F 2005 Phys. Rev. Lett. 95 143902 Google Scholar
[11]	Herink G, Kurtz F, Jalali B, Solli D R, Ropers C 2017 Science 356 50 Google Scholar
[12]	Liu X M, Yao X K, Cui Y D 2018 Phys. Rev. Lett. 121 023905 Google Scholar
[13]	徐中巍, 张祖兴 2013 物理学报 62 104210 Google Scholar Xu Z W, Zhang Z X, 2013 Acta Phys. Sin. 62 104210 Google Scholar
[14]	Sheppard A P, Kivshar Y S 1997 Phys. Rev. E 55 4773 Google Scholar
[15]	Lakomy K, Nath R, Santos L 2012 Phys. Rev. A 86 013610 Google Scholar
[16]	Lou S Y 2019 arxiv: 1909.03399 v1[nlin.SI]
[17]	Hirota R 1971 Phys. Rev. Lett., 27 1192 Google Scholar
[18]	Liu S J, Tang X Y, Lou S Y 2018 Chin. Phys. B 27 060201 Google Scholar
[19]	Ablowitz M J, Clarkson P A 1991 Solitons, Nonlinear Evolution Equations and Inverse Scattering (Cambridge: Cambridge University Press)
[20]	Li Y Q, Chen J C, Chen Y, Lou S Y 2014 Chin. Phys. Lett. 31 010201 Google Scholar
[21]	陈登远 2006 孤子引论 (北京: 科学出版社) 第14−42页 Chen D Y 2006 Introduction on Solitons (Beijing: China Science Publishing and Media Ltd) pp14−42
[22]	Lou S Y 2018 J. Math. Phys. 59 083507 Google Scholar
[23]	Sasa N, Satsuma J 1991 J. Phys. Soc. Jpn. 60 409 Google Scholar
[24]	Hirota R 1973 J. Math. Phys. 14 805 Google Scholar
[25]	Kaup D J, Newell A C 1978 J. Math. Phys. 19 798
[26]	楼森岳 2020 物理学报 69 010503 Google Scholar Lou S Y 2020 Acta Phys. Sin. 69 010503 Google Scholar

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非线性光学中的暗孤子分子