Abstract
Deep-ultraviolet (UV) second-harmonics (SHs) have important applications in basic physics and applied sciences. However, it still remains challenging to generate deep-UV SHs especially in optical fibers. Here, for the first time, we experimentally demonstrate the deep-UV SH generations (SHGs) by combined degenerate four-wave mixing (FWM) and surface nonlinearity polarization in an in-house designed and fabricated air-silica photonic crystal fiber (PCF). When femtosecond pump pulses with average input power P av of 650 mW and center wavelength λ p of 810, 820, 830, and 840 nm are coupled into the normal dispersion region close to the zero-dispersion wavelength of the fundamental mode of the PCF, the anti-Stokes waves induced by degenerate FWM process are tunable from 669 to 612 nm. Then, they serve as the secondary pump, and deep-UV SHs are generated within the wavelength range of 334.5 to 306 nm as a result of surface nonlinearity polarization at the core-cladding interface of the PCF. The physical mechanism of the SHGs is confirmed by studying the dependences of the output power P SH of the SHs on the PCF length and time. Finally, we also establish a theoretical model to analyze the SHGs.
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Introduction
Harmonic generations such as second-harmonic1,2,3,4, third-harmonic5,6,7, etc. are involved in different nonlinear processes, and can be used to generate new spectral components within ultraviolet to near-infrared wavelength region. Second-harmonic generation (SHG) as a second-order nonlinear optical phenomenon has been attracting much research interests because of important applications in biophysical imaging and multi-photon ionization8,9,10. Since the early 1980’s, SHGs in silica optical fibers11,12,13 and silicon-based waveguides14,15,16 have been reported. Compared with silicon-based waveguides, the SHG in optical fibers is limited in principle because silica glass as an amorphous material with inversion symmetry does not have second-order nonlinearity. Up to now, several methods, which include poling the optical fibers using the external light or electric fields17,18,19,20 and functionalizing the surface of the optical fiber tapers with different nonlinear materials21,22,23,24, were developed to induce second-order nonlinearity in the optical fibers. However, these methods suffer from thermo-instability and long-term instability of the induced second-order nonlinearity susceptibility, the difficulty in fabricating the ideal optical fiber tapers, and the necessity to consider the complex optical properties of the nonlinear materials.
Surface nonlinearity polarization at the core-cladding interface of the optical fibers is one of the dominant mechanisms of SHGs25,26,27, and does not have the challenges mentioned above. Since Terhune et al. theoretically investigated the formalism of such a nonlinear polarization which is induced by significant changes of the optical fiber structure and electric field near the interface region25, direct generations of second-harmonics (SHs) within the near-infrared to visible spectral regions from the incident pump based on surface nonlinearity polarization have been reported in optical fibers and photonic crystal fibers (PCFs)28,29,30. However, with only surface nonlinearity polarization, it is very difficult to directly generate deep-UV SHs from the pump pulses which are emitted by the existing mode-locked lasers centered at wavelengths of 1550, 1064, and 800 nm. In the past few years, cascaded nonlinear optical phenomena such as cascaded Raman and four-wave mixing (FWM) effects have been demonstrated to obtain visible and near-infrared wavelengths in the PCFs31,32,33,34. Based on cascaded FWM effect, it is possible that the new optical waves generated from the initial FWM process can serve as the secondary pump for the nonlinear process of the SHGs. Thus, the deep-UV SHs could be obtained by a combination of the FWM effect and surface nonlinearity polarization.
In this paper, we focus on studying the physical mechanism of the SHGs, and experimentally demonstrate for the first time deep-UV SHGs by combined degenerate FWM and surface nonlinearity polarization when femtosecond pump pulses are coupled into the normal dispersion region close to the zero-dispersion wavelength (ZDW) of the fundamental mode of an in-house designed and fabricated air-silica PCF. As the pump wavelengths change from 810 to 840 nm, the anti-Stokes waves, which are generated within the wavelength range of 669 to 612 nm from the initial FWM process, are used as the secondary pump. Then, based on surface nonlinearity polarization at the core-cladding interface of the PCF, the deep-UV SHs generated from the anti-Stokes waves are tunable from 334.5 to 306 nm.
Results and Discussion
We designed and fabricated the solid-core PCF from the purified silica material with the refractive index of ~1.46 by the stack and draw technique in our laboratory. The cross-sectional structure of the PCF is shown in the inset of Fig. 1(a), where the core diameter (D) and relative air-hole size (d/Λ) in the cladding region are 2.91 μm and 0.85, respectively. Because of the large d/Λ, three guided-modes can be supported in the fiber core, but we only focus on the characteristics of the fundamental and SH modes. Figure 1(a) shows the calculated effective refractive indices of the fundamental and SH modes considered. The group-velocity dispersion curve of the fundamental mode derived from the effective refractive index is shown in Fig. 1(b), which agrees well with the measured values by pulse time-delay method (the red solid dots). Thus, when femtosecond pulses at ~800 nm are used as the incident pump, the PCF is pumped in the normal dispersion region shorter than the ZDW of 849 nm. Insets 1 and 2 of Fig. 1(b) show the three-dimensional coupled-field profile observed at the input end of the PCF by a CCD camera and the output spatial far-field intensity distribution of the incident pump in the form of the fundamental mode, respectively. From insets 1 and 2 of Fig. 1(b), the incident pump is well coupled into the PCF and propagated in the fundamental mode. The corresponding nonlinear coefficient at ~800 nm calculated from the effective mode area is ~0.073 W−1m−1.
We used a commercial mode-locked Ti:sapphire laser (Mira 900) as the pump source, the operating wavelength of which is tunable from 780 to 900 nm and the pulse width is 120 fs. The pump pulses are coupled by a 40× microscope objective into the fundamental mode of a 30 cm long PCF by controlling the injection conditions (incident angle relative to the propagation axis, excitation radial position). The free-space coupling efficiency can be up to 65%. An optical isolator is employed to prevent the backscattered pump light into the laser cavity, and an adjustable attenuator is used to change the average input power. With the cut-back technique and a Xenon lamp as the light source, the propagation loss is measured to be above 1 dB/m around 300 nm. An optical spectrum analyzer (OSA) with a measurement range of 200 to 1100 nm is used to measure the optical spectra at the output end of the PCF. Several optical filters at different wavelengths inserted before the OSA are used to reduce the powers of the residual pump, anti-Stokes wave, and Stokes wave generated in order to prevent the OSA from damage.
In the experiment, the center wavelength λ p and average input power P av of femtosecond pump pulses should be appropriately chosen to satisfy the phase-matching condition of the FWM process for efficient generation of the SHs. When femtosecond pump pulses with the center wavelength λ p of 810 nm and average input power P av of 650 mW (peak power of 78 kW) are launched into the fundamental mode of the PCF, the calculated δκ is shown in Fig. 2(a). It is noted that δκ reaches zero at the visible and near-infrared wavelengths of 668.9 and 1026.2 nm, respectively, along with the frequency shift amount from the initial pump of ~2601 cm−1. Figure 2(b) shows the calculated δβ between the propagation constants β(ω as) and β(2ω as) of the anti-Stokes wave and SH when the anti-Stokes wave generated is considered as the pump for the SHG. It can be seen from Fig. 2(b) that δβ gradually decreases within the considered wavelength range from 0.28 to 0.4 μm. Under the same pump condition, Fig. 2(c) shows the output spectrum observed from the output end of the PCF. From Fig. 2(c), because the center wavelength of femtosecond pump pulses is close to but shorter than the ZDW (849 nm) of the fundamental mode of the PCF, self-phase modulation (SPM) plays an important role in spectral broadening of the initial pump. As a considerable part of the pump energy is depleted, the anti-Stokes and Stokes waves are generated at the wavelengths of 669 and 1026.3 nm, respectively, which agree well with the theoretical results shown in Fig. 2(a). Moreover, the anti-Stokes wave generated at 669 nm serves as the secondary pump, and the discrete SH is observed at the deep-UV wavelength of 334.5 nm. The surface nonlinearity polarization, which is resulted from the local inhomogeneity at the core-cladding interface of the PCF, is considered as the dominant mechanism for the SHG. As seen from the insets 1 and 2 of Fig. 2(c), the far-fields of the anti-Stokes wave and SH, which are observed respectively by the color and black-white-UV CCD cameras at the output end of the PCF, show the spatial distribution of the fundamental and SH modes. In the nonlinear optical process, because no pump energy is spread into the anomalous dispersion region of the fundamental mode of the PCF, the related soliton dynamics leading to continuum generation will not occur. Thus, we obtain a clean output optical spectrum of the deep-UV SH. The normal dispersion and SPM will have a determining effect on the spectral and temporal waveforms of the anti-Stokes wave and SH generated. In addition, the SHs derived from the incident pump and Stokes wave are not observed. The main reasons are as follows. First, the pump energy is greatly depleted in the process of FWM-based frequency conversion. Second, compared with the anti-Stokes wave, the energy conversion from the pump to the Stokes wave is lower. Third, the diffraction loss of the Stokes wave located at the longer wavelength which is propagated in such a small fiber core is large.
In Figs. 3(a,b), the observed full output spectra and zoom-in spectra of the SHs are shown when λ p of femtosecond pump pulses at P av of 650 mW is changed from 810, to 820, to 830, and to 840 nm, respectively. It can be seen from Figs. 3(a,b) that as λ p gradually approaches the ZDW of the fundamental mode of the PCF, more pump energy is converted into the anti-Stokes waves centered at visible wavelengths of 669, 657, 638, and 612 nm and the Stokes waves located at longer near-infrared wavelengths which are beyond consideration here, and the corresponding SHs generated at the deep-UV wavelengths of 334.5, 328.5, 319, and 306 nm are evidently enhanced. The phase-matching between the fundamental and SH modes, which depends on the dispersion characteristic of the PCF used and the combined effect of the degenerate FWM and surface nonlinearity polarization, can be achieved within a wavelength range of 28.5 nm. Compared with the gas-filled hollow-core PCF7, it is possible to generate the SHs within a broader wavelength range in such a solid-core PCF. Figure 3(c) shows the relationships between the wavelengths λ as and λ SH of the anti-Stokes waves and SHs and λ p. The approximately linear variations with larger slopes indicate that λ as and λ SH can be widely tunable as λ p changes. Estimated by Manley-Rowe relations of photon conservation, more than 40% of the total output power is contained in the anti-Stokes wave at wavelength of 612 nm. An optical filter with optical density of 0.06 and a nano-watt powermeter with sensitivity of 100 pW are combined to measure the output power of the SHs. The optical filters and nano-watt powermeter are combined to measure the output power of the SHs. Figure 3(d) shows the dependences of the measured output power P SH of the SHs and the conversion efficiency η SH from the incident pump to the SHs on λ p. For the coupling efficiency of 65% achieved, the pump power at the incident end of the PCF is up to 422.5 mW. As λ p is changed from 810, to 820, to 830, and to 840 nm, P SH are measured to be 32, 43, 66, and 101 nW, and the corresponding η SH increases from 0.76 × 10−7, to 1.02 × 10−7, to 1.56 × 10−7, and to 2.39 × 10−7, respectively.
In the following, we will show that the physical mechanism of the SHGs in the experiment is related to the characteristics of the PCF used, namely surface nonlinearity polarization, not the bulk coupling optics of the silica material and dipole formation of the silica glass. For femtosecond pump pulses with λ p = 840 nm and P av = 650 mW, Figs. 4(a,b) show the observed output spectra of the SHs and the measured variations of η SH and P SH when the PCF length is changed from 30, to 33, to 36, and to 39 cm, respectively. As shown in Figs. 4(a,b), η SH and P SH of the SHs generated decrease as the length of the PCF increases. It can be seen from Fig. 4(b) that P SH is reduced from 101, to 87, to 61, and to 25 nW, and the corresponding η SH decreases from 2.39 × 10−7, to 2.06 × 10−7, to 1.44 × 10−7, and to 0.59 × 10−7, respectively. The increased propagation loss around 300 nm in longer PCFs is considered as the main reason for the decreases in P SH and η SH. In addition, we also study the temporal dependence of P SH under the same pump condition, as shown in Fig. 5. From Fig. 5, when femtosecond pump pulses are propagated inside a span of 30 cm long PCF, P SH reaches the maximum value of 101 nW in only a few seconds, and remains relatively stable over ~60 minutes. The experimental results and observations adequately indicate that the SHGs in our work originate from the second-order nonlinearity which is induced by the surface nonlinearity polarization at the core-cladding interface of the PCF, not contributed from the bulk silica material or the dipole formation of the silica glass structure caused by the pump light field, which requires buildup time of tens of minutes to a few hours at the beginning stage of the SHGs and gradually decays over the time35, 36.
Finally, we will establish a theoretical model to analyze the SHGs based on the surface nonlinearity polarization and calculate the conversion efficiency25, 37, 38. For an m-th order guided-mode propagating along the PCF, the electric field E m(ω) and magnetic field H m(ω) can be described as
where a m(ω, z) is the scalar mode amplitude, which is a function of the angular frequency ω and propagation distance z, e m(ω, x, y), h m(ω, x, y) represent the mode field distributions across the cross-section (x, y) of the PCF’s core region, and β m(ω) is the propagation constant of the mode along the positive z direction.
The modes propagating in the PCF are described by using the HE representation. We assume that a m(ω, z) is a slowly varying function of z, and consider the frequency-doubling of the pump wave propagating as the fundamental mode (m = 1) at ω to create a SH mode (m = 2) at 2ω. Within the nonlinear coupling length l NL, near index-matching condition between the fundamental and SH modes as a function of a 1, a 2, z, l NL, and nonlinear polarization P NL can be achieved.
We exclude the bulk effect of silica material, and only consider P NL at the core-cladding interface of the PCF. The electric fields vary rapidly in the interface region because of the discontinuous effective refractive index. The gradients of the electric field in the core-cladding interface can lead to the SHG through P NL, which is dependent of the electric field components on the core side of the core-cladding interface. When the cylindrical coordinate system is used, P NL inside the interface region can be described as
where the parameters L, M, and N can be calculated by considering the interface contribution within l NL 25, and ε 0 = 8. 854187817 × 10−12 F/m is the vacuum dielectric constant.
In the nonlinear optical process of SHG, the conversion efficiency of SH can be calculated by combining the coupled nonlinear equations in ref. 25 and Eqs. (1)–(3). For femtosecond pump pulses with λ p = 840 nm and P av = 650 mW (peak power = 78 kW) and the PCF length of 30 cm, the calculated η SH is on the order of 10−6 when the fiber length-dependent phase-mismatch and fiber core non-uniformity along the z direction are considered25. The theoretical calculation supports the conjecture that the physical mechanism of the SHGs in our work is dominated by surface nonlinearity polarization. The difference between the theoretical and experimental (2.39 × 10−7) results could be due to propagation loss including the silica material absorption, core-cladding structure scattering, and leakage losses. Moreover, the longitudinal variation of the PCF geometric structure would result in the fluctuation of the dispersion profile of the fundamental mode, which will have detrimental effect on the FWM process and the efficiency of the SHGs. Methods to enhance the conversion efficiency and output power of the SHs include purifying the silica material to reduce its UV absorption loss, optimizing the fiber structure parameters, and improving the fabrication technique to reduce the scattering and leakage losses such that good fiber longitudinal uniformity is obtained. In addition, we can also choose the appropriate fiber length to reduce the propagation loss and employ high power pump laser to increase the output powers of the anti-Stokes waves generated as the secondary pump.
Conclusion
In summary, deep-UV SHs within the wavelength range of 334.5 to 306 nm are experimentally demonstrated for the first time when femtosecond pump pulses are coupled into the normal dispersion region close to the ZDW of the fundamental mode in an in-house designed and fabricated air-silica PCF. The SHGs are realized by the combined degenerate FWM and surface nonlinearity polarization at the core-cladding interface of the PCF. Our findings from the study of the fundamental physical mechanism of SHGs in PCFs provide a way to obtain deep-UV SHs, which would have important applications in basic physics and applied sciences, such as surfaces and interfaces in physical system39, multi-photon ionization40, etc.
Methods
Phase-matching calculation for the FWM process
The degenerate FWM as a third-order parametric process can efficiently transfer energy from the pump wave to the two new optical waves when the matching conditions of the frequencies and the wave-vectors are satisfied at the same time. In the process of energy conversion, two incident pump photons at initial frequency ω p are annihilated, while an anti-Stokes photon and a Stokes photon at up- and down-shifted frequencies ω as and ω s are simultaneously created, that is, 2ω p = ω as + ω s. Moreover, the phase-mismatch factor δκ induced by the silica material, fiber structure, and nonlinearity can be written as δκ = 2β (ω p) − β (ω as) − β(ω s) − 2γP, where β(ω p), β(ω as), and β(ω s) are the wave-vectors of the pump, anti-Stokes wave, and Stokes wave, respectively, γ is the wavelength-dependent nonlinear coefficient, and P is the pump peak power. Significant FWM process can occur only if δκ = 0 is satisfied.
Phase-matching calculation for the SHG process
For the SHG process, two pump photons at frequency ω p are up-converted to one SH photon with twice the incident pump optical frequency of ω p. The phase-mismatch parameter δβ between the fundamental and SH modes can be described as δβ = β(2ω p) −2β(ω p), where β(ω p) and β(2ω p) represent the propagation constants of the fundamental pump beam and its SH, respectively.
References
Li, G. X. et al. Continuous control of the nonlinearity phase for harmonic generations. Nat. Mater. 14, 607–612 (2015).
Vukovic, N. et al. Tunable continuous wave emission via phase-matched second harmonic generation in a ZnSe microcylindrical resonator. Sci. Rep. 5, 11798 (2015).
Roland, I. et al. Phase-matched second harmonic generation with on-chip GaN-on-Si microdisks. Sci. Rep. 6, 34191 (2016).
Timurdogan, E., Poulton, C. V., Byrd, M. J. & Watts, M. R. Electric field-induced second-order nonlinear optical effects in silicon waveguides. Nat. Photon. 11, 200–206 (2017).
Ivanov, A. A. et al. Multimode anharmonic third-order harmonic generation in a photonic-crystal fiber. Phys. Rev. E 73, 016610 (2006).
Fedotov, A. B. et al. Multifrequency third-harmonic generation by red-shifting solitons in a multimode photonic-crystal fibeo. Phys. Rev. E 75, 016614 (2007).
Nold, J. et al. Pressure-controlled phase matching to third harmonic in Ar-filled hollow-core photonic crystal fiber. Opt. Lett. 35, 2922–2924 (2010).
Campagnola, P. J. & Dong, C. Y. Second harmonic generation microscopy: principles and applications to disease diagnosis. Laser Photon. Rev. 5, 13–26 (2011).
Linnenbank, H. & Linden, S. Second harmonic generation spectroscopy on second harmonic resonant plasmonic metamaterials. Optica 2, 698–701 (2015).
Sartorello, G. et al. Ultrafast optical modulation of second- and third-harmonic generation from cut-disk-based metasurfaces. ACS Photon. 3, 1517–1522 (2016).
Fujii, Y., Kawasaki, B. S., Hill, K. O. & Johnson, D. C. Sum-frequency light generation in optical fibers. Opt. Lett. 5, 48–50 (1980).
Sasaki, Y. & Ohmori, Y. Phase-matched sum-frequency light generation in optical fibers. Appl. Phys. Lett. 39, 466–468 (1981).
Stolen, R. H. & Tom, H. W. K. Self-organized phase-matched harmonic generation in optical fibers. Opt. Lett. 12, 585–587 (1987).
Cazzanelli, M. et al. Second-harmonic generation in silicon waveguides strained by silicon nitride. Nat. Mater. 11, 148–154 (2012).
Ning, T. et al. Efficient second-harmonic generation in silicon nitride resonant waveguide gratings. Opt. Lett. 37, 4269–4271 (2012).
Lin, Z., Liang, X., Lončar, M., Johnson, S. G. & Rodriguez, A. W. Cavity-enhanced second-harmonic generation via nonlinear-overlap optimization. Optica 3, 233–238 (2016).
Corbari, C., Kazansky, P. G., Slattery, S. A. & Nikogosyan, D. N. Ultraviolet poling of pure fused silica by high-intensity femtosecond radiation. Appl. Phys. Lett. 86, 071106 (2005).
An, H. & Fleming, S. Second-order optical nonlinearity in thermally poled borosilicate glass. Appl. Phys. Lett. 89, 181111 (2006).
Canagasabey, A., Corbari, C., Zhang, Z., Kazansky, P. G. & Ibsen, M. Broadly tunable second-harmonic generation in periodically poled silica fibers. Opt. Lett. 32, 1863–1865 (2007).
Tombelaine, V., Lesvigne, C. B., Leproux, P., Couderc, V. & Mélin, G. Optical poling in germanium-doped microstructured optical fiber for visible supercontinuum generation. Opt. Lett. 33, 2011–2013 (2008).
Daengngam, C. et al. Demonstration of a cylindrically symmetric second-order nonlinear fiber with self-assembled organic surface layers. Opt. Express 19, 10326–10335 (2011).
Pal, S. S., Mondal, S. K., Bajpai, P. P. & Kapur, P. Optical fiber tip for field-enhanced second harmonic generation. Opt. Lett. 37, 4017–4019 (2012).
Luo, W., Guo, W., Xu, F. & Lu, Y. Q. Efficient surface second-harmonic generation in slot micro/nano-fibers. Opt. Express 21, 11554–11561 (2013).
Elzahaby, E. A., Kandas, I. & Aly, M. H. Second harmonic generation in thin optical fibers via cladding modes. Opt. Express 24, 11435–11446 (2016).
Terhune, R. W. & Weinberger, D. A. Second-harmonic generation in fibers. J. Opt. Soc. Am. B 4, 661–674 (1987).
Cheng, T. L. et al. Widely tunable second-harmonic generation in a chalcogenide–tellurite hybrid optical fiber. Opt. Lett. 39, 2145–2147 (2014).
Tombelaine, V. et al. Ultra wide band supercontinuum generation in air-silica holey fibers by SHG-induced modulation instabilities. Opt. Express 13, 7399–7404 (2005).
Russell, P. S. J. Photonic-crystal fibers. J. Lightw. Technol. 24, 4729–4749 (2006).
Dudley, J. M. & Taylor, J. R. Ten years of nonlinear optics in photonic crystal fibre. Nat. Photon. 3, 85–90 (2009).
Reader-Harris, P. & Falco, A. Di. Nanoplasmonic filters for hollow core photonic crystal fibers. ACS Photon. 1, 985–989 (2014).
Vanholsbeeck, F., Coen, S., Emplit, P., Martinelli, C. & Sylvestre, T. Cascaded Raman generation in optical fibers: influence of chromatic dispersion and Rayleigh backscattering. Opt. Lett. 29, 998–1000 (2004).
McKinstrie, C. J. & Raymer, M. G. Four-wave-mixing cascades near the zero-dispersion frequency. Opt. Express 14, 9600–9610 (2006).
Arismar Cerqueira, S. J. et al. Highly efficient generation of broadband cascaded four-wave mixing products. Opt. Express 16, 2816–2828 (2008).
Yuan, J. H. et al. Spectrally-isolated violet to blue wavelength generation by cascaded degenerate four-wave mixing in a photonic crystal fiber. Opt. Lett. 41, 2612–2615 (2016).
Antonyuk, B. P., Novikova, N. N., Didenko, N. V. & Aktsipetrov, O. A. All optical poling and second harmonic generation in glasses: theory and experiment. Phys. Lett. A 287, 161–168 (2001).
Moura, A. L., De Araujo, M. T., Vermelho, M. V. D. & Aitchison, J. S. Improved stability of the induced second-order nonlinearity in soft glass by thermal poling. J. Appl. Phys. 100, 033509 (2006).
Guyot-Sionnest, P., Chen, W. & Shen, Y. R. General considerations on optical second-harmonic generation from surfaces and interfaces. Phys. Rev. B 33, 8254–8263 (1986).
Rodríguez, F. J., Wang, F. X., Canfield, B. K., Cattaneo, S. & Kauranen, M. Multipolar tensor analysis of second-order nonlinear optical response of surface and bulk of glass. Opt. Express 15, 8695–8701 (2007).
Kott, K. L., Higgins, D. A., McMahon, R. J. & Corn, R. M. Observation of photoinduced electron transfer at a liquid-liquid interface by optical second harmonic generation. J. Am. Chem. Soc. 115, 5342–5343 (1993).
Cheng, T., Liu, J. & Chen, S. Floquet study of ionization and high-order harmonic generation for a hydrogen atom in high-frequency laser fields. Eur. Phys. J. D 18, 19–26 (2002).
Acknowledgements
This work is partly supported by the National Natural Science Foundation of China (61475023), the Beijing Youth Top-notch Talent Support Program (2015000026833ZK08), the Beijing Natural Science Foundation (4152037), the Fund of State Key Laboratory of Information Photonics and Optical Communications (BUPT) P. R. China (IPOC2016ZT05), Shenzhen Science and Technology Innovation Commission (JCYJ20160331141313917), the Hong Kong Scholars Program 2013 (PolyU G-YZ45), and the Research Grant Council of the Hong Kong Special Administrative Region China (PolyU152173/17E).
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Y.J.H., K.Z., and L.F. designed the research. Z.G.Y. and Z.X.T. fabricated the PCF. Z.G.Y., M.C., S.X.Z., and W.Q. measured the fiber dispersion value and prepared the Fig. 1. Y.B.B., Z.X., and Z.K.P. carried out the simulation and prepared the Fig. 2. Y.J.H., K.Z., and L.F. carried out the experiments and prepared the Figs. 3–5 under the supervision of W.K.R., Y.C.X., L.C., T.H.Y., and W.P.K. A.Y.J.H., K.Z., L.F., and W.P.K.A. wrote the main manuscript. All authors contributed to the revision of the manuscript.
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Yuan, J., Kang, Z., Li, F. et al. Deep-ultraviolet second-harmonic generation by combined degenerate four-wave mixing and surface nonlinearity polarization in photonic crystal fiber. Sci Rep 7, 9224 (2017). https://doi.org/10.1038/s41598-017-10028-3
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DOI: https://doi.org/10.1038/s41598-017-10028-3
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