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Optics Express

Optics Express

  • Editor: C. Martijn de Sterke
  • Vol. 16, Iss. 8 — Apr. 14, 2008
  • pp: 5406–5420
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Nonlinear dynamics of two-color optical vortices in lithium niobate crystals

Alexander Dreischuh, Dragomir N. Neshev, Vesselin Z. Kolev, Solomon Saltiel, Marek Samoc, Wieslaw Krolikowski, and Yuri S. Kivshar  »View Author Affiliations


Optics Express, Vol. 16, Issue 8, pp. 5406-5420 (2008)
http://dx.doi.org/10.1364/OE.16.005406


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Abstract

We study experimentally the nonlinear dynamics of two-color optical vortex beams in the presence of second-harmonic generation combined with the effects of photo- and thermal refraction, as well as self- and induced-phase modulation. We use an iron-doped lithium niobate crystal as a nonlinear medium for the vortex propagation and observe experimentally, depending on the laser wavelength, a decay of a double-charge vortex, splitting and reshaping of background beam, pattern formation, and controllable nonlinear rotation of a vortex pair.

© 2008 Optical Society of America

1. Introduction

The study of optical vortices (OVs) has received a special attention in recent years due to a variety of potential applications of the vortex beams including particle micro-manipulation [1

1. D. G. Grier, “A revolution in optical manipulation,” Nature 424, 810–816 (2003). [CrossRef] [PubMed]

], imaging [2

2. G. Foo, D. M. Palacios, and G. A. Swartzlander, “Optical vortex coronagraph,” Opt. Lett. 30, 3308–3310 (2005). [CrossRef]

], interferometry [3

3. S. Furhapter, A. Jesacher, S. Bernet, and M. Ritsch Marte, “Spiral interferometry,” Opt. Lett. 30, 1953–1955 (2005). [CrossRef] [PubMed]

], and quantum information [4

4. G. Molina Terriza, J. P. Torres, and L. Torner, “Twisted photons,” Nature Physics 3, 305–310 (2007). [CrossRef]

]. An optical vortex is associated with a light beam whose phase varies in a screw-type way around an isolated singular point. This characteristic helical phase of an OV is described by the multiplier exp(imθ), where θ is the azimuthal coordinate, and the integer number m stands for the vortex topological charge. The helical phase results in a non-zero orbital angular momentum of the light beam [5

5. L. Allen, M. J. Padgett, and M. Babiker, “The orbital angular momentum of light,” Prog. Opt. 39, 291–372 (1999). [CrossRef]

, 6

6. M. S. Soskin and M. V. Vasnetsov, “Singular optics,” Prog. Opt. 42, 219–276 (2001). [CrossRef]

] which strength depends on the vortex charge.

The optical vortices are associated with doughnut beams or Laguerre-Gaussian (LG) modes. As such they are eigenmodes of the free-space equation and propagate without any change of their shape. However, in nonlinear media the vortex propagation is affected by the beam induced change of the refractive index as well as by the phase and index gradients induced by other beams [7

7. A. S. Desyatnikov, Yu. S. Kivshar, and L. Torner, “Optical vortices and vortex solitons,” Prog. Opt. 47, 291–391 (2005). [CrossRef]

]. While in nonlinear media with the self-focusing nonlinearity the vortex beam becomes unstable due to the azimuthal modulational instability [8

8. W. J. Firth and D. V. Skryabin, “Optical solitons carrying orbital angular momentum,” Phys. Rev. Lett. 79, 2450–2453 (1997). [CrossRef]

, 9

9. D. V. Skryabin and W. J. Firth, “Dynamics of self-trapped beams with phase dislocation in saturable Kerr and quadratic nonlinear media,” Phys. Rev. E 58, 3916–3930 (1998). [CrossRef]

, 10

10. L. Torner and D. V. Petrov, “Azimuthal instabilities and self-breaking of beams into sets of solitons in bulk second-harmonic generation,” Electron. Lett. 33, 608–610 (1997). [CrossRef]

, 11

11. L. T. Vuong, T. D. Grow, A. Ishaaya, A. L. Gaeta, G. W. Hooft, ’t, E. R. Eliel, and G. Fibich, “Collapse of optical vortices,” Phys. Rev. Lett. 96, 133901–133904 (2006). [CrossRef] [PubMed]

, 12

12. V. Tikhonenko, J. Christou, and B. Luther-Davies, “Spiraling bright spatial solitons formed by the breakup of an optical vortex in a saturable self-focusing medium,” J. Opt. Soc. Am. B 12, 2046–2052 (1995). [CrossRef]

], in self-defocusing media a doughnut beam can form a dark vortex soliton with a strongly localized self-trapped vortex core [7

7. A. S. Desyatnikov, Yu. S. Kivshar, and L. Torner, “Optical vortices and vortex solitons,” Prog. Opt. 47, 291–391 (2005). [CrossRef]

, 13

13. Yu. S. Kivshar and B. Luther-Davies, “Dark optical solitons: physics and applications,” Phys. Rep. 298, 81–197 (1998). [CrossRef]

, 14

14. Yu. S. Kivshar and G. P. Agrawal, Optical Solitons: From Fibers to Photonic Crystals (Academic Press, San Diego, 2003).

]. Analogously to point vortices in fluid dynamics [15

15. D. Rozas, Z. S. Sacks, and G. A. Swartzlander, “Experimental observation of fluidlike motion of optical vortices,” Phys. Rev. Lett. 79, 3399–3402 (1997). [CrossRef]

, 16

16. E. B. Sonin, “Vortex oscillations and hydrodynamics of rotating superfluids,” Rev. Mod. Phys. 59, 87–155 (1987). [CrossRef]

], optical vortices of the same charge with localized cores orbit each other at the rate which is inversely proportional to the squared vortex separation distance [17

17. D. Rozas, C. T. Law, and G. A. Swartzlander, “Propagation dynamics of optical vortices,” J. Opt. Soc. Am. B 14, 3054–3065 (1997). [CrossRef]

, 18

18. D. Neshev, A. Dreischuh, M. Assa, and S. Dinev, “Motion control of ensembles of ordered optical vortices generated on finite extent background,” Opt. Commun. 151, 413–421 (1998). [CrossRef]

]. The nonlinearity of the material, being the key for manipulation of the vortex dynamics [17

17. D. Rozas, C. T. Law, and G. A. Swartzlander, “Propagation dynamics of optical vortices,” J. Opt. Soc. Am. B 14, 3054–3065 (1997). [CrossRef]

, 19

19. G. Indebetouw, “Optical vortices and their propagation,” J. Mod. Opt. 40, 73–87 (1993). [CrossRef]

, 20

20. F. S. Roux, “Dynamical behavior of optical vortices,” J. Opt. Soc. Am. B 12, 1215–1221 (1995). [CrossRef]

, 21

21. Yu. S. Kivshar, J. Christou, V. Tikhonenko, B. Luther-Davies, and L. M. Pismen, “Dynamics of optical vortex solitons,” Opt. Commun. 152, 198–206 (1998). [CrossRef]

, 22

22. G. H. Kim, H. J. Lee, L. U. Kim, and H. Suk, “Propagation dynamics of optical vortices with anisotropic phase profiles,” J. Opt. Soc. Am. B 20, 351–359 (2003). [CrossRef]

], can alter dramatically this type of the vortex fluid-like motion, including the vortex steering [23

23. J. Christou, V. Tikhonenko, Yu. S. Kivshar, and B. LutherDavies, “Vortex soliton motion and steering,” Opt. Lett. 21, 1649–1651 (1996). [CrossRef] [PubMed]

] and the rotation of a vortex pair [18

18. D. Neshev, A. Dreischuh, M. Assa, and S. Dinev, “Motion control of ensembles of ordered optical vortices generated on finite extent background,” Opt. Commun. 151, 413–421 (1998). [CrossRef]

, 24

24. B. Luther-Davies, R. Powles, and V. Tikhonenko, “Nonlinear rotation of 3-dimensional dark spatial solitons in a gaussian laser-beam,” Opt. Lett. 19, 1816–1818 (1994). [CrossRef] [PubMed]

].

One of the important nonlinear processes which affects strongly the vortex propagation in a nonlinear medium is the parametric frequency conversion. In this process the orbital angular momentum of the vortex beam is conserved. Thus, when the fundamental frequency (FF) beam carries an orbital angular momentum, the generated harmonic beams have to carry an orbital angular momentum as well, resulting in the generation of a two-color optical vortex. In the general case of the frequency mixing of two LG modes with the topological charges m 1 and m 2, the generated vortex has a topological charge of m 3=m 1+m 2 [25

25. A. Berzanskis, A. Matijosius, A. Piskarskas, V. Smilgevicius, and A. Stabinis, “Conversion of topological charge of optical vortices in a parametric frequency converter,” Opt. Commun. 140, 273–276 (1997). [CrossRef]

]. Therefore, in the parametric process such as the second-harmonic generation (SHG) the topological charge of an optical vortex should double [5

5. L. Allen, M. J. Padgett, and M. Babiker, “The orbital angular momentum of light,” Prog. Opt. 39, 291–372 (1999). [CrossRef]

, 7

7. A. S. Desyatnikov, Yu. S. Kivshar, and L. Torner, “Optical vortices and vortex solitons,” Prog. Opt. 47, 291–391 (2005). [CrossRef]

, 26

26. I. V. Basistiy, V. Y. Bazhenov, M. S. Soskin, and M. V. Vasnetsov, “Optics of light-beams with screw dislocations,” Opt. Commun. 103, 422–428 (1993). [CrossRef]

, 27

27. K. Dholakia, N. B. Simpson, M. J. Padgett, and L. Allen, “Second-harmonic generation and the orbital angular momentum of light,” Phys. Rev. A 54, R3742–R3745 (1996). [CrossRef] [PubMed]

, 28

28. M. S. Soskin and M. V. Vasnetsov, “Nonlinear singular optics,” Pure Appl. Opt. 7, 301–311 (1998). [CrossRef]

]. Higher-charge vortices however, are structurally unstable and weak perturbation can initiate a decay of the second-harmonic (SH) vortex into a pair of single-charge vortices [29

29. A. Dreischuh, G. G. Paulus, F. Zacher, F. Grasbon, D. Neshev, and H. Walther, “Modulational instability of multiple-charged optical vortex solitons under saturation of the nonlinearity,” Phys. Rev. E 60, 7518–7524 (1999). [CrossRef]

]. Such perturbations can arise from the spatial overlap of the first- and second-harmonic beams and the complex field gradients due to back conversion from the SH beam to the FF beam.

In typical crystals used for SHG, a variety of additional nonlinear processes, such as photorefraction, thermal focusing/defocusing, and Kerr-type self-phase modulation, can influence the nonlinear propagation of a vortex beam. When ultrashort pulses of high-peak intensities are used, the frequency conversion processes can also be accompanied by cascaded parametric [30

30. S. M. Saltiel, A. A. Sukhorukov, and Yu. S. Kivshar, “Multistep parametric processes in nonlinear optics” Prog. Opt. 47, 1–73 (2005). [CrossRef]

] and higher-order nonlinear processes (e.g. self- and induced-phase modulation). The rich dynamics of such combined nonlinear interactions calls for a systematic study of the vortex dynamics in the process of SHG accompanied by the action of additional effects.

In this paper we study experimentally the nonlinear dynamics of two-color optical vortices generated in the process of non-phase matched SHG and affected by the combined effect of several different nonlinear processes such as thermal focusing, photorefractive effect, and self- and induced phase modulation. We use an iron-doped lithium niobate crystal as a nonlinear medium for the vortex propagation and observe a variety of interesting nonlinear effects including a decay of a double-charge vortex, splitting and reshaping of the background beam, pattern formation, and nonlinear rotation of the a vortex pair.

2. Experimental arrangements and parameters

In our experiments we generate OVs by passing the laser beam through a computer generated hologram (CGH) and selecting the ‘+1’ or ‘-1’ diffraction order after the hologram as shown in Fig. 1(top). The hologram is fabricated by etching of the corresponding vortex interference pattern onto a glass substrate. The holographic grating has a period of 80µm and a diffraction efficiency of approximately 30% in the first order. The selected diffraction order is then focused by a lens onto an iron-doped Lithium Niobate (LiNbO3) crystal with dimensions 3×15× 20 mm. The crystal is cut with c-axis parallel to its longest side [Fig. 1(top)]. The output of the crystal is then monitored with a CCD camera and digitized on a computer.

The LiNbO3 is a negative uniaxial crystal that exhibits a combination of electro-optical, piezoelectric, pyroelectric, and photorefractive (PR) properties which makes it attractive for applications in frequency conversion [31

31. K. H. Yang, J. R. Morris, P. L. Richards, and Y. R. Shen, “Phase-matched far-infrared generation by optical mixing of dye laser beams,” Appl. Phys. Lett. 23, 669–671 (1973). [CrossRef]

, 32

32. G. D. Miller, R. G. Batchko, W. M. Tulloch, D. R Weise, M. M. Fejer, and R. L. Byer, “42%-efficient single-pass cw second-harmonic generation in periodically poled lithium niobate,” Opt. Lett. 22, 1834–1836 (1997). [CrossRef]

], optical modulators [33

33. K. Noguchi, O. Mitomi, and H. Miyazawa, “Millimeter-wave Ti : LiNbO3 optical modulators,” J. Lightwave Technol. 16, 615–619 (1998). [CrossRef]

], optically-written waveguides [34

34. G. C. Valley, M. Segev, B. Crosignani, A. Yariv, M. M. Fejer, and M. C. Bashaw, “Dark and bright photovoltaic spatial solitons,” Phys. Rev. A 50, R4457–R4460 (1994). [CrossRef] [PubMed]

], sensors [35

35. D. Runde, S. Brunken, C. E. Rutter, and D. Kip, “Integrated optical electric field sensor based on a Bragg grating in lithium niobate,” Appl. Phys. B 86, 91–95 (2007). [CrossRef]

], and holographic recording [36

36. F. S. Chen, J. T. LaMacchia, and D. B. Fraser, “Holographic storage in lithium niobate,” Appl. Phys. Lett. 13, 223 (1968). [CrossRef]

, 37

37. X. An, D. Psaltis, and G. W. Burr, “Thermal fixing of 10,000 holograms in LiNbO3 : Fe,” Appl. Opt. 38, 386–393 (1999). [CrossRef]

]. The LiNbO3 is a well established optical material [38

38. D. N. Nikogosyan, Properties of Optical and Laser-Related Materials: A Handbook (Wiley, Chichester, UK, 1997).

, 39

39. L. Arizmendi, “Photonic applications of lithium niobate crystals,” Phys. Status Solidi A 201, 253–283 (2004). [CrossRef]

] with good nonlinear properties. It is most commonly used as a medium with quadratic nonlinearity, but other effective third-order nonlinearities, including photorefractive, thermal, and pure electronic Kerr-type nonlinearity are well pronounced.

Fig. 1. Experimental arrangement (top) and absorption of the Fe:LiNbO3 crystal (bottom). Solid and dashed lines indicate the FF and SH wavelengths corresponding to the three different cases in the experiment. CHG: computer generated hologram, L: focusing lens.

The crystalline structure of the LiNbO3 is 3m thus it lacks inversion symmetry allowing the process of SHG. Obtaining proper phase matching conditions for wavelengths in the visible and near infra-red however, is practically impossible in LiNbO3. For example, for degenerate phase matching of SHG at 1064 nm, temperatures of the order of -5 °C are required [40

40. F. Pettazzi, V. Coda, M. Chauvet, and E. Fazio, “Frequency-doubling in self-induced waveguides in lithium niobate,” Opt. Commun. 272, 238–241 (2007). [CrossRef]

]. At other temperatures, the birefringent phase matching leads to spatial walk-off between the fundamental frequency and the second harmonic. To satisfy the phase-matching conditions in the degenerate case of propagation along the optical axis, the technique of periodic poling is exploited to ensure quasi-phase-matching. The LiNbO3 appears well suitable for periodic poling and various techniques for such poling have been demonstrated [39

39. L. Arizmendi, “Photonic applications of lithium niobate crystals,” Phys. Status Solidi A 201, 253–283 (2004). [CrossRef]

, 41

41. R. G. Batchko, M. M. Fejer, R. L. Byer, D. Woll, R. Wallenstein, V. Y. Shur, and L. Erman, “Continuous-wave quasi-phase-matched generation of 60 mW at 465 nm by single-pass frequency doubling of a laser diode in backswitch-poled lithium niobate,” Opt. Lett. 24, 1293–1295 (1999). [CrossRef]

].

σ(λ)=exp[ln(2)(λλb)2λw2],
(1)

with λ>λb=400nm and λw=150 nm.

The defocusing photovoltaic nonlinearity in LiNbO3 can support vortex solitons. The first observation of vortex self-trapping was reported in Fe-doped LiNbO3 in Ref. [46

46. Z. Chen, M. Segev, D. W. Wilson, R. E. Muller, and P. D. Maker, “Self-trapping of an optical vortex by use of the bulk photovoltaic effect,” Phys. Rev. Lett. 78, 2948–2951 (1997). [CrossRef]

].

LiNbO3 also exhibits third order Kerr-type nonlinearity, which is positive and approximately three times larger than the nonlinearity of BK7 glass. For a wavelength of 1.06µm the value of the nonlinear coefficient is n 2=9.1×10-20 [m2/W] [47

47. R. DeSalvo, A. A. Said, D. J. Hagan, E. W. Van Stryland, and M. SheikBahae, “Infrared to ultraviolet measurements of two-photon absorption and n(2) in wide bandgap solids,” IEEE J. Quantum Electron. 32, 1324–1333 (1996). [CrossRef]

]. Even though this is a small value, the contribution of the Kerr nonlinearity can become appreciable when high power short laser pulses are used. The Kerr effect is mainly expressed in self-phase modulation of the pulse but, as can be seen below, can dramatically affect vortex propagation.

Due to the non-negligible absorption of our crystal in the visible and near infrared region (400–800 nm) [Fig. 1(bottom)], part of the laser beam power can be absorbed during the process of linear or two-photon absorption. The absorption of a portion of the laser power leads to heating of the sample and change of its refractive index via thermooptic effect. In the case of LiNbO3 the thermooptic coefficients are 1.4×10-6K-1 for the ordinary and 39×10-6K-1 for the extraordinary polarization components, respectively at a wavelength of 1.06µm [48

48. D. H. Jundt, M. M. Fejer, and R. L. Byer, “Optical-properties of lithium-rich lithium-niobate fabricated by vapor transport equilibration,” IEEE J. Quantum Electron. 26, 135–138 (1990). [CrossRef]

]. This thermooptic effect results in an effective increase of the material refractive index and therefore self-focusing effect of the beam. The increased light intensity due to the process of thermal self-focusing on the other hand facilitates the increase of the other nonlinear effects like SHG and Kerr-nonlinearity.

The combination of different nonlinearities in LiNbO3 has been studied in the terms of SHG enhancement via photorefractive soliton induced waveguides [49

49. S. Lan, M. F. Shih, G. Mizell, J. A. Giordmaine, Z. G. Chen, C. Anastassiou, J. Martin, and M. Segev, “Second-harmonic generation in waveguides induced by photorefractive spatial solitons,” Opt. Lett. 24, 1145–1147 (1999). [CrossRef]

]. When the SH wave is generated in a crystal with non-negligible photorefraction the beam dynamics is far more rich [50

50. A. D. Boardman, W. Ilecki, and Y. Liu, “Spatial solitons in a photorefractive medium sustaining second-harmonic generation,” J. Opt. Soc. Am. B 19, 832–838 (2002). [CrossRef]

]. As seen from Eq. (1), depending on the FF wavelength, λFF, the photorefraction could be initiated by the second harmonic (wavelength λSH), or to a different extent, by both the first and second harmonics. As a result, the phase matching for SHG changes in time and space. This effect appears similar to the influence of the Kerr nonlinearity on the four-wave mixing process [51

51. J. F. Reintjes, Nonlinear Optical Parametric Processes in Liquids and Gasses (Academic Press, New York, 1984).

, 52

52. S. Dinev and A. Dreischuh, “Sum-frequency generation in the xuv,” Opt. Quantum Electron. 23, 91–97 (1991). [CrossRef]

, 53

53. A. Dreischuh, U. Reiter Domiaty, D. Gruber, L. Windholz, and S. Dinev, “Nonlinear alignment between conical emissions generated in a four-wave parametric mixing process,” Appl. Phys. B 66, 175–180 (1998). [CrossRef]

].

In optical soliton-induced waveguides the nonlinear frequency conversion relies on phase matching between the guided modes, which have different propagation constants than the free propagating waves. This difference in propagation constants enables photorefractive tuning of the SHG process by modifying the properties of the guided modes. The first proposal of this idea (when the waveguides are induced by bright screening solitons) [54

54. M. F. Shih, Z. G. Chen, M. Mitchell, M. Segev, H. Lee, R. S. Feigelson, and J. P. Wilde, “Waveguides induced by photorefractive screening solitons,” J. Opt. Soc. Am. B 14, 3091–3101 (1997). [CrossRef]

], followed by successful SHG [49

49. S. Lan, M. F. Shih, G. Mizell, J. A. Giordmaine, Z. G. Chen, C. Anastassiou, J. Martin, and M. Segev, “Second-harmonic generation in waveguides induced by photorefractive spatial solitons,” Opt. Lett. 24, 1145–1147 (1999). [CrossRef]

] and SH wavelength tuning [55

55. S. Lan, C. Anastassiou, M. Segev, M. Shih, J. A. Giordmaine, and G. Mizell, “Tuning of second-harmonic generation in waveguides induced by photorefractive spatial solitons,” Appl. Phys. Lett. 77, 2101–2103 (2000). [CrossRef]

] in KNbO3 was recently confirmed in LiNbO3 [40

40. F. Pettazzi, V. Coda, M. Chauvet, and E. Fazio, “Frequency-doubling in self-induced waveguides in lithium niobate,” Opt. Commun. 272, 238–241 (2007). [CrossRef]

]. It is also shown [56

56. S. Orlov, A. Yariv, and M. Segev, “Nonlinear self-phase matching of optical second harmonic generation in lithium niobate,” Appl. Phys. Lett. 68, 1610–1612 (1996). [CrossRef]

] that in Fe-doped LiNbO3 crystals used in photovoltaic regime, nonlinear refractive index change originating from the second-harmonic-induced space-charge field can give rise to SH self-phase matching and effective increase of the SHG efficiency.

The experimental observation of enhanced SH in photovoltaic-dark-soliton-induced waveguide [57

57. C. Lou, J. Xu, H. Qiao, X. Zhang, Y. Chen, and Z. Chen, “Enhanced second-harmonic generation by means of high-power confinement in a photovoltaic soliton-induced waveguide,” Opt. Lett. 29, 953–955 (2004). [CrossRef] [PubMed]

] is qualitatively similar to the observations with bright solitons [49

49. S. Lan, M. F. Shih, G. Mizell, J. A. Giordmaine, Z. G. Chen, C. Anastassiou, J. Martin, and M. Segev, “Second-harmonic generation in waveguides induced by photorefractive spatial solitons,” Opt. Lett. 24, 1145–1147 (1999). [CrossRef]

, 55

55. S. Lan, C. Anastassiou, M. Segev, M. Shih, J. A. Giordmaine, and G. Mizell, “Tuning of second-harmonic generation in waveguides induced by photorefractive spatial solitons,” Appl. Phys. Lett. 77, 2101–2103 (2000). [CrossRef]

, 56

56. S. Orlov, A. Yariv, and M. Segev, “Nonlinear self-phase matching of optical second harmonic generation in lithium niobate,” Appl. Phys. Lett. 68, 1610–1612 (1996). [CrossRef]

]. In the experiment of Ref. [57

57. C. Lou, J. Xu, H. Qiao, X. Zhang, Y. Chen, and Z. Chen, “Enhanced second-harmonic generation by means of high-power confinement in a photovoltaic soliton-induced waveguide,” Opt. Lett. 29, 953–955 (2004). [CrossRef] [PubMed]

] the dark soliton is created with a weak continuous-wave background laser beam with an one-dimensional odd dark stripe. Femtosecond pulse train is used as fundamental wave, while both the FF and SH radiation are able to cause photorefraction and to destroy the optically-written waveguide when the dark soliton is absent.

Here we explore a somewhat different geometry with a two-dimensional dark dislocation which is embedded already in the FF beam. In addition, we also employ three different laser sources enabling us to distinguish between different nonlinear phenomena pronounced in the LiNbO3 crystal.

The parameters of the three different laser sources used in our experiments are summarized in Table 1. The lasers differ in wavelength and power, allowing us to observe independently the influence of the different nonlinear effects on vortex dynamics. In the first experiments, refereed below as Case 1, we use a Ti:Sapphire femtosecond oscillator (Mira 900, Coherent) emitting at a wavelength of 845 nm. In the second case, Case 2, a picosecond mode-locked

Table 1. Parameters of the lasers and the Fe3+:LiNbO3 crystal. GVM - group velocity mismatch, SOD - second order dispersion.

table-icon
View This Table
Crystal parameters [38

38. D. N. Nikogosyan, Properties of Optical and Laser-Related Materials: A Handbook (Wiley, Chichester, UK, 1997).

]
Refractive index nωo 2.24972.23192.2139
nωe 2.17102.15562.1402
n 2ω o 2.40762.32312.2658
n 2ω e 2.30542.23402.1842
Group index ngro (ω)2.342592.296682.26643
ngre (ω)2.251022.211352.18496
ngro (2ω)2.918922.585062.38843
ngre (2ω)2.734872.457432.29041
GVM length LW, mm0.10 (o-o)26.48 (o-o)0.52 (o-o)
0.15 (o-e)47.51 (o-e)0.60 (o-e)
0.12 (e-e)31.03 (e-e)2.65 (e-e)
FF SODSOD, fs2 1183 (o)821 (o)409 (o)
1019 (e)712 (e)362 (e)
FF pulse broadening τ out, fs143 (o)18 ps150
142 (e)18 ps150
Coherence length L coh, µm1.57 (ee-e)131.0 (oo-e)8.3 (ee-e)

laser at 1064nm was employed, and in the last case, Case 3, we used a Ti:Sapphire amplified system (Clark-MXR 2001) and a parametric amplifier (Light Conversion TOPAS) emitting at a wavelength of 1464 nm.

When the LiNbO3 crystal is oriented with its c-axis perpendicular to the FF beam polarization (ordinary) the propagation lengths are either l cryst=3mm or 15mm[Fig. 1(top)]. The estimated pulse walk-off lengths due to group velocity mismatch (GVM) between the FF and the SH are [38

38. D. N. Nikogosyan, Properties of Optical and Laser-Related Materials: A Handbook (Wiley, Chichester, UK, 1997).

] LW=(τ 2 FF+τ 2 SH)1/2/|1/VFFg-1/VSHg|, thus for the three lasers we have three different propagation regimes: LWl cryst for Case 1 (λFF=845 nm), LW>l cryst for Case 2 (λFF=1064nm), and LW~l cryst for Case 3 (λFF=1464 nm). The long LW in Case 2 is mainly due to the longer duration of the pulse (18 ps).

The second-order dispersion (SOD) and the FF output pulse durations at the exit of the sample are estimated using refractive index data from [38

38. D. N. Nikogosyan, Properties of Optical and Laser-Related Materials: A Handbook (Wiley, Chichester, UK, 1997).

] according to the relations SOD=λ 3 0 l cryst/(2πc 2)(d 2 n/ 2). Then the pulse broadening due to SOD can be estimated as τout=τin[1+16ln(2)SOD 2/τ 4 in]1/2 (valid in a Gaussian pulse shape approximation with τin being the input full-width pulse duration at half maximum) [58

58. A. E. Siegman, Lasers (University Science Books, Sausalito, Calif., 1986), p. 1283.

]. Our estimates for the pulse broadening (see Table 1) show that in all three cases this effect is weak and can be largely neglected.

For the process of SHG an important parameter is the coherence length, lcoh, defined as lcoh=π/|Δk|, where Δk=4πn(ω)/λFF-2πn(2ω)/λSH. As shown in Table 1, in all cases lcohl cryst, therefore the process of SHG is realised under the condition of strong phase mismatch.

Fig. 2. (a) Calculated [64] pulse profiles of the FF (solid line) and SH (dashed line) normalized to their maximum intensity at the crystal output. (b) Average power of the ordinary and extraordinary second harmonic [SH(o) and SH(e), respectively] vs. angle of rotation of the FF beam polarization. Focusing by f=50mm lens, l cryst=3 mm. Specific polarization components of interacting waves are marked with vertical lines. Solid lines: spline to the experimental points.

The relatively long femtosecond pulses allow us to employ a CGH for the generation of the OV beams without noticeable OV beam smearing [59

59. K. Bezuhanov, A. Dreischuh, G. G. Paulus, M. G. Schatzel, and H. Walther, “Vortices in femtosecond laser fields,” Opt. Lett. 29, 1942–1944 (2004). [CrossRef] [PubMed]

, 60

60. K. Bezuhanov, A. Dreischuh, G. G. Paulus, M. G. Schatzel, H. Walther, D. Neshev, W. Krolikowski, and Y. Kivshar, “Spatial phase dislocations in femtosecond laser pulses,” J. Opt. Soc. Am. B 23, 26–35 (2006). [CrossRef]

], pulse-front tilt [61

61. S. Szatmari, G. Kuhnle, and P. Simon, “Pulse-compression and traveling-wave excitation scheme using a single dispersive element,” Appl. Opt. 29, 5372–5379 (1990). [CrossRef] [PubMed]

] and associated pulse lengthening [62

62. F. Grasbon, A. Dreischuh, G. G. Paulus, F. Zacher, and H. Walther, “Femtosecond interferometric autocorrelations in the presence of pulse front distortions,” Proc. SPIE 3571, 164–168 (1999). [CrossRef]

]. The problem of topological dispersion [63

63. G. A. Swartzlander and J. Schmit, “Temporal correlation vortices and topological dispersion,” Phys. Rev. Lett. 93, 093901–093904 (2004). [CrossRef] [PubMed]

] (frequency-dependent OV topological charge) was absent as seen in Figs. 4(a,d) and the length needed to separate the desired first-order diffractedOV beam was only adjusted depending on the FF laser wavelength.

3. Case I: λFF=845nm

3.1. Characterization of the effective nonlinearity

The input 140 fs pulses broaden negligibly (by 2–3 fs) along the LiNbO3 crystal for both FF wave polarizations. The GVM length is much shorter than the sample length (l cryst=3 mm), hence the SHG at normal incidence is strongly influenced by the group-velocity mismatch. This is well expressed in Fig. 2(a) which shows the calculated [64

64. SNLO nonlinear optics code available from A. V. Smith, Sandia National Laboratories, Albuquerque, NM87185-1423.

] output pulse profiles of the FF and SH fields. The intensities are normalized to their maximal value. From the plot we see that the SH is emitted in two separate pulses [65

65. P. P. Ho, D. Ji, Q. Z. Wang, and R. R. Alfano, “Temporal behavior of cross-phase-modulated second-harmonic generation of ultrashort laser pulses in nonlinear-optical media,” J. Opt. Soc. Am. B 7, 276–284 (1990) [CrossRef]

] one of which is locked to the FF pulse and the other is delayed due to GVM.

In order to check the phase-matching conditions experimentally, we vary the FF beam polarization at the input facet of the crystal. After a polarisation filtering, the ordinary and extra-ordinary components [SH(o) and SH(e)] of the generated SH are recorded. The strong, nearly symmetric oscillations and the low conversion efficiency [Fig. 2(b)] are indicative for the non-phase-matched regime of the SHG. Each individual measurement in Fig. 2(b) is done at a fresh location of the crystal and at a reproducible waiting time of 2 s. According to Eq. (1) both the pump and the generated SH are able to initiate photorefraction, since the lower (three orders of magnitude) photosensitivity at the FF wavelength is compensated by the (five orders of magnitude) stronger FF intensity. In Fig. 3 we present the time evolution of the far-field FF (upper rows) and SH beam patterns (lower rows) when excited by a Gaussian FF beam. The crystal c-axis direction is vertical. Fig. 3(a) refers to a vertical (extraordinary) FF beam polarization, whereas the pictures in Fig. 3(b) are obtained with a horizontal (ordinary) FF beam polarization. Comparing the ordinary and extraordinary SH signals in Fig. 2(b), the frames in Fig. 3(a) correspond to the regime (ee-e) with dominating conversion efficiency, while these in Fig. 3(b), to (oo-e)-regime. The infrared FF beam (λFF=845 nm) becomes elongated along the c-axis and this is stronger pronounced for extraordinary FF beam polarization. The formation of side lobes in the FF beam in this case [see Fig. 3(a), lower row, t=16s] we explain by two mechanisms of the SH beam pattern development [56

56. S. Orlov, A. Yariv, and M. Segev, “Nonlinear self-phase matching of optical second harmonic generation in lithium niobate,” Appl. Phys. Lett. 68, 1610–1612 (1996). [CrossRef]

].

Fig. 3. Far-field FF (upper row) and SH beam patterns (lower row) vs. time: Gaussian input FF beam. Type of interaction: (a) ee-e; (b) oo-e.

At the initial stage (see Fig. 3, virtual time t=0 s) the SH beam appears ring-shaped. The relatively fast (of the order of milliseconds), initial isotropic and polarization-independent response in the material indicates refractive index changes of a thermal origin [66

66. M. Horowitz, R. Daisy, O. Werner, and B. Fischer, “Large thermal nonlinearities and spatial self-phase modulation in SrxBa1-xNb2O6 and BaTiO3 crystals,” Opt. Lett. 17, 475–477 (1992). [CrossRef] [PubMed]

] and results in a formation of a bright symmetric ring [not clearly visible in Fig. 3(a, 0 s)]. At this initial stage the Gaussian input FF beam also creates photorefractive carriers with symmetric distribution, however it takes longer time for these charges to separate and create space-charge field. The formation of a single bright ring at this initial stage indicates a positive refractive index Near field Far field modulation Δn~3×10-4. Later, the photorefractive nonlinearity clearly dominates, resulting in a strong asymmetry in the transverse plane and development of a complex beam structure simultaneously in the FF and SH beams. The dominating photorefractive effect also leads to a total negative index change.

Fig. 4. SH far-field (upper row) and near field (lower row) energy density distributions of the OV beam at an initial (a,d), intermediate (b,e), and final evolution stages (c,f). The arrows indicate the position of the two vortices.

When both the FF and SH waves are extraordinary [Fig. 3(a)], the strong PR nonlinearity reshapes the ring and a complex pattern is formed in the far field. The pronounced asymmetry in the ±c-direction [see Fig. 3(a), lower row, t=16 s] is due to the diffusion field [56

56. S. Orlov, A. Yariv, and M. Segev, “Nonlinear self-phase matching of optical second harmonic generation in lithium niobate,” Appl. Phys. Lett. 68, 1610–1612 (1996). [CrossRef]

].

With ordinary polarized FF waves [Fig. 3(b)], in the SH wave we observe side-lobes (t=2 s) developing in a broad (of the order of the frame window, unfortunately not well visible) halo-like structure (for t~4–8 s) surrounding the elongated (along c-axis) main part of the beam.

In summary to this subsection, in the Case 1, the nonlinear processes which accompany the SHG are the thermal positive index change at a short millisecond time scale, followed by much stronger photorefraction from both FF and SH fields on a time scale of a few seconds.

3.2. Vortex dynamics

Fig. 5. (a) Calculated [64] pulse profiles of the FF (solid line) and SH (dashed line) normalized to their maximum intensity at the crystal output. (b) Average power of the extra-ordinary second harmonic vs. angle of rotation of the FF beam polarization. Focusing by f=38mm lens; l cryst=3 mm). Specific polarization components of interacting waves are marked with vertical lines. Solid line: spline to experimental points.

When the output of the crystal was imaged with a microscope objective (×4) onto a CCD camera [Figs. 4(d–f)] we can monitor the vortex distribution at the crystal output (near field). The recorded energy density distributions of the SH OV beam are shown in Fig. 4, lower row. As seen in Fig. 4(d), there are no signatures of diffraction reshaping and topological dispersion. The corresponding intermediate and final evolution stages are shown in Fig. 4(e) and (f), respectively. The central dark curved line is caused by the split SH OVs and the FF OV tending to line up along the sample c-axis. When the FF OV charge was reversed by rotating the CGH at 180° the SH images appeared flipped about a central vertical line, thus confirming that the observed pattern is only caused by vortex deformation and break-up.

4. Case 2: λFF=1064nm

4.1. Characterization of the effective nonlinearity

For this experimental case, first we carried out benchmark measurements of the origin of the photorefraction in the crystal and its influence on the SHG phase-matching. Nonlinear self-phase matching of the SHG in LiNbO3 at 1064nm has been demonstrated with a Q-switched mode-locked laser emitting 100 ps pulses [56

56. S. Orlov, A. Yariv, and M. Segev, “Nonlinear self-phase matching of optical second harmonic generation in lithium niobate,” Appl. Phys. Lett. 68, 1610–1612 (1996). [CrossRef]

]. In this process, the presence of SH changes spatially the refractive index of the material, thus causing a change in the SH phase matching conditions. This change leads to improved conversion efficiency with stronger SH component resulting in a feedback self-matching mechanism. In contrast to Ref. [56

56. S. Orlov, A. Yariv, and M. Segev, “Nonlinear self-phase matching of optical second harmonic generation in lithium niobate,” Appl. Phys. Lett. 68, 1610–1612 (1996). [CrossRef]

], here we use a crystal oriented strictly at a normal incidence (with c-axis perpendicular to the incoming beam) and a mode-locked Nd:YVO4 laser emitting shorter (18 ps) pulses at a repetition rate of 1.5MHz [67

67. V. Z. Kolev, M. J. Lederer, B. Luther-Davies, and A. V. Rode, “Passive mode locking of a Nd:YVO4 laser with an extra-long optical resonator,” Opt. Lett. 28, 1275–1277 (2003). [CrossRef] [PubMed]

]. Due to this pulse duration the generated SH pulse always overlaps with the FF pulse inside the crystal as shown in Fig. 5(a). The average power of the generated extraordinary SH at the output facet of the crystal (l cryst=3mm) is shown in Fig. 5(b) as a function of the FF beam input polarization. With an input average power PFF=30mW the ordinary SH always remained below 7nW, whereas the polarization-dependent extraordinary SH showed pronounced oscillations with input polarisation and reveal that the only possible type of interaction is oo-e. Each measurement is done at a fresh location of the crystal after a waiting time of 5 s.

Fig. 6. Growth of the SH(e) mean power with time. Type of interaction: (oo-e). Gaussian FF beam is focused in (a) the center of the sample (l cryst=15 mm), on its input (b), and output facets (c) with a f=38mm AR-coated lens.

In Fig. 6 we show the increase of the SH(e) power with time when the FF beam is focused in the center (a) of the sample, on its input (b), and output facets (c). The crystal itself was rotated to use longer beam propagation (l cryst=15 mm). Since only the focusing conditions are changed from curve to curve, the enhancement of the SH(e) average power with time is a clear signature of photovoltaic self-phase matching [56

56. S. Orlov, A. Yariv, and M. Segev, “Nonlinear self-phase matching of optical second harmonic generation in lithium niobate,” Appl. Phys. Lett. 68, 1610–1612 (1996). [CrossRef]

]. In order to determine wheatear the origin of photorefraction is coming from the FF or the SH wave, we performed a test experiment where the beam of a cw Nd:YAG laser (Coherent 1064-100) with three times higher output power (90mW) was focused on the crystal with the same polarization. Since no signature of cw beam reshaping or fanning was observed, we are convinced that the self-phase-matching effect (Fig. 6) is due to the photovoltaic field induced by the extraordinary SH light which changes (via photorefraction) the refractive indices and phase-matching conditions. Thus for this case, we can conclude that along with the SHG process we have a strong contribution of photorefractive nonlinearity induced entirely by the SH field at 532 nm.

4.2. Vortex dynamics

Fig. 7. Rotation of the SH(e) OV pair with time: Input polarisation at 45° with respect to the c-axis. l cryst=15 mm; focusing by f=38mm lens. Inset: initial (left; t=0) and stationary SH pattern (right; t=30 min).

5. Case 3: λFF=1464nm

5.1. Characterization of the effective nonlinearity

In the SH spectra recorded at different positions of the LiNbO3 crystal, we observe strong dependence of the SH spectral width, Δλ, ranging from 10.5nm (at large waist offset, but still detectable SH) to ΔλMAX=24.1 nm (at the longitudinal position z=0 inside the crystal). In Fig. 8(a) (solid diamonds) we show the normalized SH spectral width ΔλλMAX for the half of the recorded data. The reason for this spectral broadening is the third-order nonlinear process of induced-phase modulation (IPM) from the FF pulse to the SH. Due to the mild focusing of the FF beam, we can neglect the linear diffraction inside the 3mm long crystal. Then by using the fit of the experimental data [Fig. 8(a), solid curve] and the relation Δλ/λMAX~1/[1+(z/LD)] coming from the intensity variation in the vicinity of the FF beam waist, we can estimate the Rayleigh diffraction length LD=3.6mm for the FF vortex beam. Since the SH wavelength is twice shorter and the SH beam radius w is expected to decrease by a factor of √2 with respect to the FF beams, this diffraction length is also a reasonable estimate for the SH beam. The dashed curve in Fig. 8(a) visualizes the beam broadening with increasing offset of the crystal from the beam waist which decreases the FF beam intensity. The reduced intensity decreased the effect of the IPM on the SH and consequently the normalized SH spectral width ΔλλMAX.

Fig. 8. (a) Normalized spectral width Δλ (z/LD)/ΔλMAX of the SH pulses (diamonds – experimental data, solid curve – sigmoidal fit) and normalized FF beam spectral broadening ω(z/LD)/ω 0 (dashed) vs. crystal position. (b,c) SH spectra of the OV pulses at different positions of the LiNbO3 crystal. ΔλMAX=24 nm (full width at 1/e intensity level) at x=0, whereas Δλ=17.5 and 10.5 nm at crystal positions z=0.7LD and 3LD, respectively.

Since the estimated GVM length LW (e-e) is approximately equal to the sample length and ngre (ω)<ngro,e(2ω), the generated SH will be influenced mainly by the trailing wing of the FF pulse. Therefore, in the case of a positive third-order nonlinearity, the IPM-assisted spectral broadening has to be asymmetric. In this case one can expect an induced shift of the SH center-of-gravity wavelength (λc) and stronger oscillations in one of the wings of the SH spectra [68

68. R. R. Alfano, P. L. Baldeck, P. P. Ho, and G. P. Agrawal, “Cross-phase modulation and induced focusing due to optical nonlinearities in optical fibers and bulk materials,” J. Opt. Soc. Am. B 6, 824–829 (1989). [CrossRef]

, 69

69. I. W. Hsieh, X. G. Chen, J. I. Dadap, N. C. Panoiu, R. M. Osgood, S. J. Mcnab, and Y. A. Vlasov, “Cross-phase modulation-induced spectral and temporal effects on co-propagating femtosecond pulses in silicon photonic wires,” Opt. Express 15, 1135–1146 (2007), http://www.opticsinfobase.org/abstract.cfm?URI=oe-15-3-1135. [CrossRef] [PubMed]

]. In Fig. 8(b,c) such signatures are clearly visible when comparing the SH spectra (solid curves) recorded near [Fig. 8(b)] or at the FF beam waist [Fig. 8(c)] with the spectrum of the weak SH signal at a large offset (x/LD=3) from the FF beam waist (dashed curves). Because of the short propagation path-length in the crystal, it is unlikely that the observed red shift Δλc≈4 nm(Δν≈74 cm-1) of the spectrum is due to the intrapulse Raman scattering [70

70. F. M. Mitschke and L. F. Mollenauer, “Discovery of the soliton self-frequency shift,” Opt. Lett. 11, 659–661 (1986). [CrossRef] [PubMed]

, 71

71. J. P. Gordon, “Theory of the soliton self-frequency shift,” Opt. Lett. 11, 662–664 (1986). [CrossRef] [PubMed]

].

5.2. Vortex dynamics

In the spatial domain, the presence of OV in the FF beam leads to the generation of a double-charge OV in the SH beam, which splits into a pair of two OVs. The fast response of the electronic Kerr-type nonlinearity allows us to study the process of the vortex rotation (similar to Case 2), but for a positive nonlinearity and with respect to the position of the beam focusing. In Fig. 9(a) we show the retrieved angle of the rotation of an OV pair in the SH field as a function of the longitudinal position z of the crystal. The dashed curve is a sigmoidal fit intended to guide the eye only. The sequence of frames shows the far-field images recorded experimentally at the crystal positions as marked by dashed-blue circles. Despite the focusing Kerr nonlinearity, the azimuthal instability of the vortex beam [11

11. L. T. Vuong, T. D. Grow, A. Ishaaya, A. L. Gaeta, G. W. Hooft, ’t, E. R. Eliel, and G. Fibich, “Collapse of optical vortices,” Phys. Rev. Lett. 96, 133901–133904 (2006). [CrossRef] [PubMed]

] is not pronounced in our experiments due to a short propagation length and mild focusing inside the crystal.

In order to compare the rotation angle in the nonlinear regime with the rotation due to linear Guoy phase shift, we normalize the longitudinal coordinate to the effective Rayleigh diffraction length LD. In this way, we can add in Fig. 9(a) the solid curve for the calculated linear Guoy phase shift at the distances of interest. For the sake of clarity one has to mention that both the GVM length LW and the Rayleigh diffraction length LD are comparable to the sample length l cryst. Since a significant OV rotation of ≈90° is achieved over a distance z/LD~1.5, whereas the Gouy shift over this distance is only 40° (in agreement with Ref. [17

17. D. Rozas, C. T. Law, and G. A. Swartzlander, “Propagation dynamics of optical vortices,” J. Opt. Soc. Am. B 14, 3054–3065 (1997). [CrossRef]

]) the results strongly indicate a nonlinear origin of the vortex pair rotation. As seen in Fig. 9(b), the SH OVs rotation with increasing the offset of the crystal from the FF beam waist is accompanied by changes in their radial positions. To our knowledge, this is the first experimental observation of the rotation of a vortex pair due to the effect of pure Kerr-type nonlinearity.

Fig. 9. (a) Rotation angle of a OV pair vs. crystal position. Squares - experimental data, dashed curve - sigmoidal fit. Solid curve - calculated rotation angle due to linear Guoy phase shift only. (b) Projection of the vortex trajectories onto the CCD camera. Lower row: experimental far-field images corresponding to the points on the graph marked with circles.

6. Conclusions

We have presented a systematic experimental study of the nonlinear dynamics of two-color optical vortices in the presence of non-phase-matched second-harmonic generation and additional nonlinear effects of photo- and thermal refraction, self- and induced-phase modulation. We have revealed several different scenarios of the vortex evolution. When the medium is photosensitive to both the fundamental and second-harmonic wavelengths (Case 1), the different time-scales of the thermal and photovoltaic nonlinearity lead to an alignment of the two colors of the vortex beam in near field and to the generation of complex spatial patterns in far field. However, when photorefraction is initiated by the generated second-harmonic beam only (Case 2), the nonlinear self-phase matching is accompanied by rotation of a two-color vortex by 90°. Finally, we have achieved controllable vortex rotation with two-fold nonlinear increase, as well as spectral broadening of the femtosecond vortices due to the pump-induced phase modulation with possible successive femtosecond vortex pulse compression (Case 3).

Acknowledgements

The authors thank Barry Luther-Davies for a help with the laser systems and useful discussions. This work was supported by the Australian Research Council (Grant LX0666552) and the National Science Fund in Bulgaria (contract F-1303/2003). A. D. and S. S. thank the Nonlinear Physics Center of the Australian National University for a warm hospitality and support.

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S. Lan, M. F. Shih, G. Mizell, J. A. Giordmaine, Z. G. Chen, C. Anastassiou, J. Martin, and M. Segev, “Second-harmonic generation in waveguides induced by photorefractive spatial solitons,” Opt. Lett. 24, 1145–1147 (1999). [CrossRef]

50.

A. D. Boardman, W. Ilecki, and Y. Liu, “Spatial solitons in a photorefractive medium sustaining second-harmonic generation,” J. Opt. Soc. Am. B 19, 832–838 (2002). [CrossRef]

51.

J. F. Reintjes, Nonlinear Optical Parametric Processes in Liquids and Gasses (Academic Press, New York, 1984).

52.

S. Dinev and A. Dreischuh, “Sum-frequency generation in the xuv,” Opt. Quantum Electron. 23, 91–97 (1991). [CrossRef]

53.

A. Dreischuh, U. Reiter Domiaty, D. Gruber, L. Windholz, and S. Dinev, “Nonlinear alignment between conical emissions generated in a four-wave parametric mixing process,” Appl. Phys. B 66, 175–180 (1998). [CrossRef]

54.

M. F. Shih, Z. G. Chen, M. Mitchell, M. Segev, H. Lee, R. S. Feigelson, and J. P. Wilde, “Waveguides induced by photorefractive screening solitons,” J. Opt. Soc. Am. B 14, 3091–3101 (1997). [CrossRef]

55.

S. Lan, C. Anastassiou, M. Segev, M. Shih, J. A. Giordmaine, and G. Mizell, “Tuning of second-harmonic generation in waveguides induced by photorefractive spatial solitons,” Appl. Phys. Lett. 77, 2101–2103 (2000). [CrossRef]

56.

S. Orlov, A. Yariv, and M. Segev, “Nonlinear self-phase matching of optical second harmonic generation in lithium niobate,” Appl. Phys. Lett. 68, 1610–1612 (1996). [CrossRef]

57.

C. Lou, J. Xu, H. Qiao, X. Zhang, Y. Chen, and Z. Chen, “Enhanced second-harmonic generation by means of high-power confinement in a photovoltaic soliton-induced waveguide,” Opt. Lett. 29, 953–955 (2004). [CrossRef] [PubMed]

58.

A. E. Siegman, Lasers (University Science Books, Sausalito, Calif., 1986), p. 1283.

59.

K. Bezuhanov, A. Dreischuh, G. G. Paulus, M. G. Schatzel, and H. Walther, “Vortices in femtosecond laser fields,” Opt. Lett. 29, 1942–1944 (2004). [CrossRef] [PubMed]

60.

K. Bezuhanov, A. Dreischuh, G. G. Paulus, M. G. Schatzel, H. Walther, D. Neshev, W. Krolikowski, and Y. Kivshar, “Spatial phase dislocations in femtosecond laser pulses,” J. Opt. Soc. Am. B 23, 26–35 (2006). [CrossRef]

61.

S. Szatmari, G. Kuhnle, and P. Simon, “Pulse-compression and traveling-wave excitation scheme using a single dispersive element,” Appl. Opt. 29, 5372–5379 (1990). [CrossRef] [PubMed]

62.

F. Grasbon, A. Dreischuh, G. G. Paulus, F. Zacher, and H. Walther, “Femtosecond interferometric autocorrelations in the presence of pulse front distortions,” Proc. SPIE 3571, 164–168 (1999). [CrossRef]

63.

G. A. Swartzlander and J. Schmit, “Temporal correlation vortices and topological dispersion,” Phys. Rev. Lett. 93, 093901–093904 (2004). [CrossRef] [PubMed]

64.

SNLO nonlinear optics code available from A. V. Smith, Sandia National Laboratories, Albuquerque, NM87185-1423.

65.

P. P. Ho, D. Ji, Q. Z. Wang, and R. R. Alfano, “Temporal behavior of cross-phase-modulated second-harmonic generation of ultrashort laser pulses in nonlinear-optical media,” J. Opt. Soc. Am. B 7, 276–284 (1990) [CrossRef]

66.

M. Horowitz, R. Daisy, O. Werner, and B. Fischer, “Large thermal nonlinearities and spatial self-phase modulation in SrxBa1-xNb2O6 and BaTiO3 crystals,” Opt. Lett. 17, 475–477 (1992). [CrossRef] [PubMed]

67.

V. Z. Kolev, M. J. Lederer, B. Luther-Davies, and A. V. Rode, “Passive mode locking of a Nd:YVO4 laser with an extra-long optical resonator,” Opt. Lett. 28, 1275–1277 (2003). [CrossRef] [PubMed]

68.

R. R. Alfano, P. L. Baldeck, P. P. Ho, and G. P. Agrawal, “Cross-phase modulation and induced focusing due to optical nonlinearities in optical fibers and bulk materials,” J. Opt. Soc. Am. B 6, 824–829 (1989). [CrossRef]

69.

I. W. Hsieh, X. G. Chen, J. I. Dadap, N. C. Panoiu, R. M. Osgood, S. J. Mcnab, and Y. A. Vlasov, “Cross-phase modulation-induced spectral and temporal effects on co-propagating femtosecond pulses in silicon photonic wires,” Opt. Express 15, 1135–1146 (2007), http://www.opticsinfobase.org/abstract.cfm?URI=oe-15-3-1135. [CrossRef] [PubMed]

70.

F. M. Mitschke and L. F. Mollenauer, “Discovery of the soliton self-frequency shift,” Opt. Lett. 11, 659–661 (1986). [CrossRef] [PubMed]

71.

J. P. Gordon, “Theory of the soliton self-frequency shift,” Opt. Lett. 11, 662–664 (1986). [CrossRef] [PubMed]

OCIS Codes
(190.0190) Nonlinear optics : Nonlinear optics
(190.2620) Nonlinear optics : Harmonic generation and mixing
(190.4420) Nonlinear optics : Nonlinear optics, transverse effects in
(190.5330) Nonlinear optics : Photorefractive optics
(190.5940) Nonlinear optics : Self-action effects

ToC Category:
Nonlinear Optics

History
Original Manuscript: January 22, 2008
Revised Manuscript: March 31, 2008
Manuscript Accepted: March 31, 2008
Published: April 3, 2008

Citation
Alexander Dreischuh, Dragomir N. Neshev, Vesselin Z. Kolev, Solomon Saltiel, Marek Samoc, Wieslaw Krolikowski, and Yuri S. Kivshar, "Nonlinear dynamics of two-color optical vortices in lithium niobate crystals," Opt. Express 16, 5406-5420 (2008)
http://www.opticsinfobase.org/oe/abstract.cfm?URI=oe-16-8-5406


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