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An all-dielectric metasurface as a broadband optical frequency mixer

Nature Communicationsvolume 9, Article number: 2507 (2018) | Download Citation

Abstract

A frequency mixer is a nonlinear device that combines electromagnetic waves to create waves at new frequencies. Mixers are ubiquitous components in modern radio-frequency technology and microwave signal processing. The development of versatile frequency mixers for optical frequencies remains challenging: such devices generally rely on weak nonlinear optical processes and, thus, must satisfy phase-matching conditions. Here we utilize a GaAs-based dielectric metasurface to demonstrate an optical frequency mixer that concurrently generates eleven new frequencies spanning the ultraviolet to near-infrared. The even and odd order nonlinearities of GaAs enable our observation of second-harmonic, third-harmonic, and fourth-harmonic generation, sum-frequency generation, two-photon absorption-induced photoluminescence, four-wave mixing and six-wave mixing. The simultaneous occurrence of these seven nonlinear processes is assisted by the combined effects of strong intrinsic material nonlinearities, enhanced electromagnetic fields, and relaxed phase-matching requirements. Such ultracompact optical mixers may enable a plethora of applications in biology, chemistry, sensing, communications, and quantum optics.

Introduction

Mixers are devices that convert electromagnetic wave frequencies and are indispensable in signal processing. For example, radio-frequency mixers have been widely employed in modern communications and navigation systems as modulators, phase detectors, frequency synthesizers, heterodyne receivers, etc1. Frequency mixers are also in great demand at optical frequencies, where nonlinear crystals are used to generate new colors through nonlinear optical processes such as harmonic generation, sum-frequency and difference-frequency generation and high-order harmonic generation. These nonlinear optical processes have greatly broadened the accessible spectrum and are ubiquitous in applications ranging from cutting-edge science and technology to our daily life (such as green color laser pointers). Recent applications of nonlinear optical mixing include attosecond pulse generation2, supercontinuum generation3, optical frequency comb generation4, material characterization5, and quantum optics6. Until now, these applications have relied on bulk nonlinear crystals whose dimensions are much larger than the operating wavelengths and, to achieve efficient frequency conversion, the fundamental and newly generated frequencies need to travel in-phase (i.e., be phase matched) inside the nonlinear medium7. Consequently, dispersive isotropic materials such as GaAs, although possessing large nonlinear coefficients, cannot be used. Instead, birefringent materials with much smaller nonlinear susceptibilities such as lithium niobate and barium borate are widely employed. However, due to dispersion, phase matching can only be achieved for one nonlinear process within a narrow bandwidth, and wavelength tuning is achieved by varying incident angles, or using different crystals. Quasi-phase matching8,9,10,11 can be used to exploit the large nonlinearities of isotropic materials, but its utility is limited by narrow bandwidth operation, with spectral tuning being achieved by angular rotation, temperature tuning, or electric field bias. Therefore, a device that enables multiple frequency mixing processes across a wide spectral range can be a powerful and versatile platform—however such a device has not been realized using conventional nonlinear optics.

The emergence of nanoresonators, metamaterials, and metasurfaces has revolutionized our perception of nonlinear optical processes12. In contrast to bulk nonlinear optical crystals, subwavelength resonant cavities13,14,15,16, nanoparticles and nanoantennas17,18 greatly enhance electromagnetic fields in tight volumes18,19 and relax phase-matching conditions. This allows the simultaneous occurrence of various nonlinear processes20,21,22. More recently, semiconductor dielectric metamaterials, operating below the bandgap, have attracted intense attention due to their low material losses at optical frequencies23,24, as well as their resonant interaction with both the electric and magnetic fields25. In particular, odd order nonlinear optical processes including two-photon absorption26, third-harmonic generation (THG)27, and four-wave mixing (FWM)28 were studied in dielectric metasurfaces made from centrosymmetric semiconductors such as silicon and germanium. On the other hand, even order nonlinear effects such as second-harmonic generation (SHG)29,30 and sum-frequency generation (SFG)22 were not reported until the realization of III–V semiconductor nanoresonators or metasurfaces23, see Supplementary Note 1. However, simultaneous frequency conversion including both even and odd nonlinearity has not been observed using dielectric metamaterials.

Here, we demonstrate an optical metamixer—a GaAs-based dielectric metasurface that enables a variety of simultaneous nonlinear optical processes across a broad spectral range. Specifically, seven different nonlinear processes (second-harmonic, third-harmonic, and fourth-harmonic generation, sum-frequency generation, two-photon absorption-induced photoluminescence, four-wave mixing, and six-wave mixing (SWM)) simultaneously give rise to eleven new frequencies that span the ultraviolet to NIR spectral range. Our multifunctional metamixer exploits the combined attributes of resonantly enhanced electromagnetic fields at the metasurface resonant frequencies, large even-order and odd-order optical nonlinearities of non-centrosymmetric GaAs, and significantly relaxed phase-matching conditions due to the subwavelength dimensions of the metasurface.

Results

Samples

Figure 1a shows a schematic of nonlinear frequency generation by a GaAs metasurface pumped by two laser beams. The left inset of Fig. 1a shows a 60° side-view scanning electron microscope (SEM) image of a typical GaAs metasurface used in these measurements. The metasurface consists of a periodic square array of nanocylinders with a diameter of ~400 nm. The period of the structure was chosen to avoid coupling between the nanocylinders, as well as to have the highest filling factor. Each nanocylinder consists of three layers: the top SiOx etch mask (~300 nm), the middle ~450 nm thick GaAs nanodisk that confines the electromagnetic field and the bottom low refractive index (AlxGa1−x)2O3 layer (~400 nm) for isolating the GaAs nanocylinder from the high index GaAs substrate. Note that we used a (100)-oriented GaAs wafer for the sample fabrication; see Methods for further details. The resonantly enhanced frequency mixing is achieved by exciting the lowest order magnetic dipole (MD) and electric dipole (ED) Mie resonances of the GaAs nanocylinder23,30,31,32 simultaneously. The measured reflectivity spectrum (Fig. 1b) exhibits maxima at λED ~ 1.25 μm and λMD ~ 1.5 μm which correspond to the excitation of the ED and MD resonances. This was confirmed by performing multipolar decomposition of the scattering fields, as well as by the simulated electric field profiles (shown in the insets) for the two wavelengths that correspond to maximum electromagnetic field enhancement inside the nanoresonators (1.246 μm and 1.535 μm). Note that these wavelengths occur in the vicinity of the reflectivity maxima, but the wavelength of maximum field enhancement of the MD resonance is slightly red-shifted.

Fig. 1
Fig. 1

Generation of new frequencies with the GaAs metasurface mixer. a Schematic of an optical metamixer consisting of a square array of subwavelength GaAs dielectric resonators. Two femtosecond near-IR pulses pump the metamixer and a variety of new frequencies are simultaneously generated. Inset: a 60° side-view scanning electron microscope image of the GaAs metamixer. The scale bar corresponds to 3 μm. Bottom inset: schematic energy diagrams of the seven nonlinear optical processes that occur simultaneously in our metamixer: second-hamonic generation (SHG), third-harmonic generation (THG), fourth-harmonic generation (FHG), sum-frequency generation (SFG), two-photon absorption-induced photoluminescence (TPA PL), four-wave mixing (FWM) and six-wave mixing (SWM). b Measured (solid line) and numerically simulated (dashed line) reflectance spectra of the metasurface with two cross-section local electric field distributions at the wavelengths of 1.246 μm and 1.535 μm, which correspond to the maximal electromagnetic field enhancements inside the GaAs nanodisk. c Spectra of second-, third- and fourth-harmonics when pump pulses of λ1 ~ 1.57 μm are used to excite the GaAs metamixer. Inset is the zoom-in of the fourth harmonic generation

Harmonic generation in one-beam experiments

First, we study harmonic generation by the GaAs metasurface when pumped by a single near-IR femtosecond beam with a wavelength near the MD resonance (λ1 ~ 1.57 μm) using an average power of ~4.5 μW. We used a ×20 near-IR objective with a numerical aperture NA = 0.4 to both focus the pump pulses on the GaAs metasurface and collect the harmonic beams; for further details of experimental setup see Methods and Supplementary Note 3. Figure 1c shows the second-harmonic, third-harmonic and, fourth-harmonic (inset of Fig. 1c) generated by the metasurface at λSHG ~ 785 nm, λTHG ~ 523 nm, λFHG ~ 393 nm, respectively. The efficiency of the SHG process is estimated to be 2.3 × 10−6; see Supplementary Note 4. The emission centered at λPL ~ 870 nm corresponds to GaAs photoluminescence (PL) arising from two-photon absorption (TPA) of the pump33. The observed harmonics lie above the GaAs bandgap energy and therefore suffer from significant material absorption. The conversion efficiency is much higher than the recently published record, which is high in SHG efficiency using mode-matched plasmonic nanoantennas34. Note, that in ref 13,35 even higher values of SHG efficiencies were reported due to the resonant nature of the optical nonlinearity created through a 3-level system using intersubband transitions in quantum wells. That design is not scalable beyond 3rd order nonlinearities, or to visible and near-IR wavelengths; nor can it be used to create simultaneous multiple-order nonlinearities.

Frequency mixing in two-beam experiments

Next, we introduce a second femtosecond pump beam spectrally tuned to λ2 ~ 1.24 μm to overlap the resonators’ ED mode. The collinearly propagating pump beams were focused at the same location on the sample with average powers of P1 ~ 3.6 μW and P2 ~ 5 μW, respectively. When the two pump beams are temporally coincident, we observe eleven spectral peaks, ranging from ~380 to ~1000 nm (Fig. 2a).

Fig. 2
Fig. 2

Frequency mixing in GaAs metasurface. a Spectrum exhibiting eleven nonlinearly generated peaks originating from seven different nonlinear processes when two optical beams at λ2 ~ 1.24 μm and λ1 ~ 1.57 μm are used to simultaneously pump the GaAs metasurface. Blue labels indicate harmonic generation processes and photoluminescence arising from two-photon absorption that each requires only one pump beam. Red labels indicate frequency mixings that involves both pump beams. b, c Dependence of the sum-frequency generation \((\omega _1 + \omega _2)\), four-wave mixing \((2\omega _2 - \omega _1)\), and six-wave mixing (4ω1ω2) intensities on the power of the ω2 pump. Both the experimental data (dots) and theoretical fitting (black line for linear fitting and red curve for quadratic fitting) are shown. d Five representative spectra showing the tuning of the normalized six-wave mixing \((4\omega _1 - \omega _2)\) signal when the pump wavelengths are spectrally tuned to λ2 ~ 1248.7 nm, λ1 ~ 1557.5 nm (black curve); λ2 ~ 1234.8 nm, λ1 ~ 1558.6 nm (red curve); λ2 ~ 1211.6 nm, λ1 ~ 1558.9 nm (blue curve); λ2~1234.9 nm, λ1 ~ 1581.2 nm (green curve); and λ2 ~ 1233.7 nm, λ1 ~ 1600.4 nm (magenta curve). The arrows denote the theoretically expected frequencies for the considered six-wave mixing process

We categorize the generated signals into two groups. The first group, indicated by the blue labels, corresponds to harmonic generation processes and also PL arising from two-photon absorption. Each of the processes in this group relies on only a single pump beam. In contrast, the second group, indicated by red labels, corresponds to frequency mixing processes that require both pump pulses. The five frequency mixing signals include: sum-frequency generation (\(\omega _1 + \omega _2\)) at λSFG ~ 689 nm; three types of four-wave mixing (\(2\omega _2 - \omega _1\), \(2\omega _1 + \omega _2\), \(2\omega _2 + \omega _1\)) at ~1000 nm, ~472 nm, and ~434 nm, respectively; and six-wave mixing \(\left( {4\omega _1 - \omega _2} \right)\) at λSWM ~ 577 nm. Note, that the amplitude of the FWM \((2\omega _2 - \omega _1)\) peak is at least ten times higher than any of the other nonlinear processes. This is attributed to the much lower absorption below the GaAs bandgap in contrast to the strong attenuation experienced by the other signals. Altogether, the measured spectra contain simultaneous contributions arising from seven nonlinear optical processes.

We verify the physical origin of the frequency mixing processes by measuring the output spectra for various pump wavelengths and for different pump powers. For example, the SFG output is identified due to its energy coinciding with the sum of the photon energies of the two pump beams \(\omega _{\mathrm{{SFG}}} = \omega _1 + \omega _2\), as well as by the linear intensity dependence on one pump power when the other pump power is held constant (Fig. 2b black curve). In a similar manner, we performed power dependence measurements to verify the four-wave and six-wave mixing processes. The red curve in Fig. 2b shows the quadratic dependence of the FWM \((2\omega _2 - \omega _1)\) output on the \(\omega _2\) pump power, and Fig. 2c shows a linear dependence of the SWM intensity on the power of the pump at \(\omega _2\). Other power dependence curves are shown in Supplementary Note 5. To further confirm the SWM process, we spectrally tuned both pump wavelengths and observed excellent agreement between the measured and calculated SWM peak locations (Fig. 2d), see Supplementary Note 6. To verify that the observed nonlinear processes are enhanced by pumping at the dipolar Mie resonances, we performed similar frequency mixing measurements on both the unpatterned GaAs substrate and other GaAs metasurfaces with different diameter resonators, and as expected, significantly lower signal intensities were observed; refer to Supplementary Note 7.

Pump–probe spectroscopy of newly generated frequencies

To investigate the temporal dynamics of the nonlinear generation processes, we measured the signal intensities while varying the optical delay between the two pump pulses. Figure 3a shows a 2D contour image of the transient nonlinear conversion. As expected, the harmonic generation signals and PL arising from two-photon absorption, which each requires only one of the pumps, are observed regardless of the optical delay. In contrast, the frequency mixing signals such as SFG, FWM, and SWM appear only when the two pump pulses temporally overlap at the metasurface. Note that we also observe time-dependent spectral shifts of the SFG and FWM signals. This is likely due to the chirp of the pump pulse: for example the negative chirp of \(\omega _2\) causes the higher frequencies to arrive at the metasurface earlier than the lower frequencies; see Supplementary Note 8. More interestingly, we also observe significant changes of either pump’s harmonic generation intensities when the other pump illuminates the metasurface. For example, Fig. 3b shows the SHG dynamics of \(\omega _1\), where the intensity decreases dramatically at zero delay and then recovers with a time constant of a few picoseconds (the red fitting curve has a single exponential component of 3.7 ps). While the details of the SHG quenching require further exploration and are beyond the scope of this paper, it is likely attributed to the spectral shift and broadening of the Mie resonance that in turn causes a reduction of the field enhancement inside the resonators. As we reported before32, resonance tailoring can be realized by refractive index modulation through free-carrier generation via one-photon absorption. In the current work, a lower energy but intense pump beam can efficiently generate free-carriers through TPA process; this is further supported by the observation of photoluminescence through TPA. The fast recovery of the SHG intensity (~3.7 ps) is due to the relaxation of the free-carriers through both nonradiative recombination at surface states36,37 and higher order processes such as Auger recombination38. Note that a longer recovery time constant such as thermal cooling could also exist39 but cannot be measured reliably due to the long-term instability of our laser system.

Fig. 3
Fig. 3

Temporal dynamics of nonlinear frequency mixing. a 2D contour image of the transient nonlinear signal (logarithmic scale) when the time delay between the two pump pulses is varied. The nonlinear signals that require only one of the pumps do not depend on the delay, while the mixing signals that rely on both pumps occur only when the two pumps overlap in time. b The quenching and the recovery of the \(\omega _1\) SHG intensity due to the arrival of the second pump \(\omega _2\) at the metamixer. The black dots are experimentally measured SHG intensities and the red curve is a single component exponential fit with time constant of ~3.7 ps

Discussion

The nonlinearly generated signals shown in Figs. 13 were measured when the far-field collection angle was optimized for the SFG intensity, and we observe significant increases of the intensities of other signals when the collection angles are optimized individually. This indicates a variety of far-field emission profiles for different nonlinear signals, which significantly limits the measured conversion efficiencies, especially considering the low NA objective used40. Moreover, the majority of the nonlinearly generated frequencies lie above the GaAs bandgap and thus experience strong absorption. The conversion efficiencies can be improved by using larger bandgap materials such as AlGaAs to reduce absorption loss, or by fabricating resonators with larger dimensions so that the Mie resonances occur at longer wavelengths.

Dielectric resonators are a powerful platform that provides microscopic control over the electric field intensity and polarization distributions inside the resonator40. Higher conversion efficiencies for frequency mixing processes can be expected by engineering the resonator shape to optimize the overlap of the modes excited at the pump frequencies28,30,40. Moreover, III–V metasurfaces can be designed to tailor the polarization and far-field profiles of the nonlinear emission13,16 beyond what is possible with a single resonant particle40. The use of lower pump power might be possible when using dielectric metasurfaces based on high quality factor resonators which exhibit much larger electromagnetic field enhancements41,42. Another strategy for nonlinear optimization is to choose between (100), (110), and (111) orientations of the GaAs crystal. For example a χ(2) process relies on the nonlinear polarizability \(P^{\mathrm{{NL}}} \propto \chi _{{{ijk}}}^{\left( 2 \right)}E_{{j}}^{\omega _1}\left( {x,y,z} \right)E_{{k}}^{\omega _2}(x,y,z)\) where \(\chi _{{{ijk}}}^{\left( 2 \right)}\) is the material’s intrinsic second-order nonlinear susceptibility, \(E^{\omega _1}\) and \(E^{\omega _2}\) are the fundamental pump fields; and i, j, and k, represent x, y, and z coordinates, respectively. Thus, for the electric field distributions and polarizations of a given resonator design, the crystal orientation can be chosen to maximize the nonlinear polarization within the resonator.

Our experimental demonstration of seven different nonlinear optical processes occurring simultaneously generated in GaAs metasurfaces could provide the opportunity for realizing ultracompact optical mixers for various applications. The observed even and odd high-order nonlinear processes might allow generation of high-order harmonics which is the foundation of attosecond pulse generation43. Moreover, we anticipate that these metasurfaces could be optimized for other nonlinear mixing processes such as difference frequency generation \(\omega _{\mathrm{{DFG}}} = \omega _1 - \omega _2\). This would enable the production of femtosecond pulses covering the Mid-IR spectral range, where broadband laser-gain media and saturable absorbers do not exist.

Methods

Numerical calculations

To simulate the reflectance spectra of the GaAs metamixer, we used a finite difference time-domain simulator (Lumerical Inc.). The structural dimensions used in the simulation were: periodicity of 840 nm, SiOx etch mask cap height of 300 nm and GaAs nanocylinder height of 400 nm and diameter of 400 nm. The half etched AlGaO bottom layer consists of two parts: the planar unetched oxide layer with a thickness of 200 nm and top oxide nanodisks with a height of 200 nm and diameter of 400 nm. The GaAs and SiOx permittivity from the finite difference time-domain software were used in the simulation. The bottom AlGaO layer was considered a non-dispersive medium with refractive index of n = 1.6. The simulation was performed using an infinitely large (periodic boundary condition) metamixer structure excited by a normally incident plane wave.

To verify the excitation wavelengths of the ED and MD resonance, we performed full vector simulations in COMSOL. The elementary cell was excited by a normally incident plane wave. To perform the multipole decomposition of the scattered fields we implemented the method developed by Grahn et al.44.

Sample fabrication

The metamixer was fabricated using standard electron-beam lithography and inductively coupled plasma (ICP) etch. The sample was grown using molecular beam epitaxy with a GaAs substrate at the bottom, a 400 nm thick Al0.9Ga0.1As in the middle and a 450 nm thick GaAs at the top (wafer VA0729). The semi-insulating GaAs substrate has a crystal orientation of (100), and therefore, the top GaAs layer has the same crystal structure. We started the process from spin coating a negative tone hydrogen silsesquioxane (HSQ Fox-16) electron beam resist. Circular disk patterns were written using 100 keV electron-beam lithography that converts the HSQ to SiOx. The unexposed resist was developed using tetramethylammonium hydroxide leaving ~300 nm tall SiOx nanodisks as etch masks for GaAs. The shape of the SiOx nanodisks was then transferred onto the GaAs and AlGaAs layers using a chlorine-based (both Cl2 and BCl3) ICP etch recipe. We controlled the etch duration so the AlGaAs layer was partially etched to half of the depth. Finally, the sample was placed in a tube furnace at ~420 °C for a selective wet oxidization process that converts the Al0.85Ga0.15As into its oxide (AlxGa1−x)2O3 which has a low refractive index of n ~ 1.6. Note that the oxide has a larger lattice constant than AlGaAs, which causes the expansion of oxide thickness to be slightly larger than 400 nm.

Reflectance spectroscopy measurement setup

The reflectance spectra of the sample were measured using a home-built white-light spectroscopy setup. The broadband light emanating from a halogen lamp was focused onto the sample using a ×20 Mitutoyo near-infrared objective. The numerical aperture (NA) of the incident light was minimized (NA < 0.1) by reducing the beam diameter before it entered the back aperture of the objective. The reflected light was collected by the same objective and detected by a liquid nitrogen cooled InGaAs camera that was connected to a near-IR spectrometer (Princeton Instruments monochromator/spectrograph 2500i). The reflectance was calculated by normalizing the reflected spectrum of a gold mirror measured under the same conditions. The experimental reflectance spectrum is shown in Fig. 1b.

Nonlinear frequency mixing measurement setup

The two near-infrared femtosecond laser beams are generated using a twin-optical-parametric-amplifier that is pumped by an amplified Ti:sapphire laser with a 1 kHz repetition rate. The temporal duration (full-width at half maximum) of the optical pulses is 40–45 fs, which was measured using a frequency resolved optical gating technique. The wavelength of the two near-infrared beams can be tuned independently from 1.2 to 2.4 μm. The two beams are spatially combined by a dichroic beam combiner and then propagate collinearly afterwards. The temporal overlap between the pulses can be adjusted by a variable delay stage. Both beams are focused at the same spot on the surface of the sample by a ×20 near-infrared Mitutoyo objective with NA = 0.4. The focal spots are ~3 μm in diameter measured using the knife-edge technique. The average powers of the pump beams incident on the metamixer were varied between 0.3 to 7 μW (Fluence 3 mJcm−2 to 78 mJcm−2) for power dependent measurements.

The generated frequency mixing signals are collected by the same objective in a reflection geometry since most of the generated signals have photon energies above the GaAs bandgap and therefore would be completely absorbed in a transmission geometry. The resulting signal is then measured using a liquid nitrogen cooled silicon camera that is fitted to a spectrometer with visible gratings installed (Princeton Instruments monochromator/spectrograph 2300i). Note that only a portion of the generated signal could be collected by the low NA = 0.4 objective used in the setup.

Relative spectral response calibration of the measurement setup

Due to the wavelength dependent response (such as transmission, reflection, diffraction) of the optical components (including the objective, dichroic beam combiner, lens, grating, silicon camera, etc.), the spectral efficiency of the frequency mixing setup needs to be calibrated accurately to allow calculation of the conversion efficiencies for the newly generated frequencies. First, a calibration lamp (Ocean Optics Calibration lamp HL-3plus-CAL) was placed at the focal spot of the objective to replace the sample. The rest of the setup was kept in the same condition as when the frequency mixing spectra were measured. Then, the lamp spectrum was measured using the visible spectrometer covering the wavelength range of the nonlinear signal. The relative spectral response of the setup was calculated by dividing the measured lamp spectrum by the calibrated lamp emission spectrum provided by the manufacturer. The frequency mixing spectra shown in the paper (for example Fig. 2a) were calculated considering the setup response and subsequently normalized to one. In Fig. 2a the measured data from 950 to 1080 nm were divided by a factor of 10 for a better visualization of the results. Due to the low silicon detector responsivity within this spectral region, the spectrum was also smoothed by averaging the neighboring data points to reduce noise.

Data availability

The data that support the findings of this study are available from the corresponding author upon reasonable request.

Additional information

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References

  1. 1.

    Horowitz, P. & Hill, W. The Art of Electronics 1125 (Cambridge University Press, 1989).

  2. 2.

    Ghimire, S. et al. Observation of high-order harmonic generation in a bulk crystal. Nat. Phys. 7, 138–141 (2011).

  3. 3.

    Alfano, R. R. The Supercontinuum Laser Source, 434 (Springer-Verlag New York, 2016).

  4. 4.

    Kippenberg, T. J., Holzwarth, R. & Diddams, S. A. Microresonator-based optical frequency combs. Science 332, 555–559 (2011).

  5. 5.

    Yin, X. et al. Edge nonlinear optics on a MoS2 atomic monolayer. Science 344, 488–490 (2014).

  6. 6.

    Walmsley, I. A. Quantum optics: science and technology in a new light. Science 348, 525–530 (2015).

  7. 7.

    Boyd, R. W. Nonlinear optics (Academic Press, 2003).

  8. 8.

    Myers, L. E. et al. Quasi-phase-matched optical parametric oscillators in bulk periodically poled LiNbO3. J. Opt. Soc. Am. B 12, 2102–2116 (1995).

  9. 9.

    Fiore, A., Berger, V., Rosencher, E., Bravetti, P. & Nagle, J. Phase matching using an isotropic nonlinear optical material. Nature 391, 463–466 (1998).

  10. 10.

    Skauli, T. et al. Measurement of the nonlinear coefficient of orientation-patterned GaAs and demonstration of highly efficient second-harmonic generation. Opt. Lett. 27, 628–630 (2002).

  11. 11.

    Yoo, S. J. B. et al. Wavelength conversion by difference frequency generation in AlGaAs waveguides with periodic domain inversion achieved by wafer bonding. Appl. Phys. Lett. 68, 2609–2611 (1996).

  12. 12.

    Krasnok, A., Tymchenko, M. & Alù, A. Nonlinear metasurfaces: a paradigm shift in nonlinear optics. Mater. Today 21, 8–21 (2018).

  13. 13.

    Wolf, O. et al. Phased-array sources based on nonlinear metamaterial nanocavities. Nat. Commun. 6, 7667 (2015).

  14. 14.

    Lee, J. et al. Giant nonlinear response from plasmonic metasurfaces coupled to intersubband transitions. Nature 511, 65–69 (2014).

  15. 15.

    Lapine, M., Shadrivov, I. V. & Kivshar, Y. S. Nonlinear metamaterials. Rev. Mod. Phys. 86, 1093–1123 (2014).

  16. 16.

    Li, G., Zhang, S. & Zentgraf, T. Nonlinear photonic metasurfaces. Nat. Rev. Mater. 2, 17010 (2017).

  17. 17.

    de Ceglia, D., Vincenti, M. A. & Scalora, M. On the origin of third harmonic light from hybrid metal-dielectric nanoantennas. J. Opt. 18, 115002 (2016).

  18. 18.

    Danckwerts, M. & Novotny, L. Optical frequency mixing at coupled gold nanoparticles. Phys. Rev. Lett. 98, 026104 (2007).

  19. 19.

    Schuller, J. A. et al. Plasmonics for extreme light concentration and manipulation. Nat. Mater. 9, 193–204 (2010).

  20. 20.

    Klein, M. W., Wegener, M., Feth, N. & Linden, S. Experiments on second- and third-harmonic generation from magnetic metamaterials. Opt. Express 15, 5238–5247 (2007).

  21. 21.

    Sartorello, G. et al. Ultrafast optical modulation of second- and third-harmonic generation from cut-disk-based metasurfaces. ACS Photonics 3, 1517–1522 (2016).

  22. 22.

    Marino, G. et al. Sum-Frequency Generation and Photon-Pair Creation in AlGaAs Nano-Disks. in Conference on Lasers and Electro-Optics. FTu4D.2 (Optical Society of America) (2017).

  23. 23.

    Liu, S., Keeler, G. A., Reno, J. L., Sinclair, M. B. & Brener, I. III–V Semiconductor nanoresonators—a new strategy for passive, active, and nonlinear all-dielectric metamaterials. Adv. Opt. Mater. 4, 1457–1462 (2016).

  24. 24.

    Kuznetsov, A. I., Miroshnichenko, A. E., Brongersma, M. L., Kivshar, Y. S. & Luk’yanchuk, B. Optically resonant dielectric nanostructures. Science 354, 2472 (2016).

  25. 25.

    Jahani, S. & Jacob, Z. All-dielectric metamaterials. Nat. Nano 11, 23–36 (2016).

  26. 26.

    Shcherbakov, M. R. et al. Ultrafast all-optical switching with magnetic resonances in nonlinear dielectric nanostructures. Nano Lett. 15, 6985–6990 (2015).

  27. 27.

    Shcherbakov, M. R. et al. Enhanced third-harmonic generation in silicon nanoparticles driven by magnetic response. Nano Lett. 14, 6488–6492 (2014).

  28. 28.

    Grinblat, G., Li, Y., Nielsen, M. P., Oulton, R. F. & Maier, S. A. Degenerate four-wave mixing in a multiresonant Germanium nanodisk. ACS Photonics 4, 2144–2149 (2017).

  29. 29.

    Gili, V. F. et al. Monolithic AlGaAs second-harmonic nanoantennas. Opt. Express 24, 15965–15971 (2016).

  30. 30.

    Liu, S. et al. Resonantly enhanced second-harmonic generation using III–V semiconductor all-dielectric metasurfaces. Nano Lett. 16, 5426–5432 (2016).

  31. 31.

    Kuznetsov, A. I., Miroshnichenko, A. E., Fu, Y. H., Zhang, J. & Luk’yanchuk, B. Magnetic light. Sci. Rep. 2, 492 (2012).

  32. 32.

    Shcherbakov, M. R. et al. Ultrafast all-optical tuning of direct-gap semiconductor metasurfaces. Nat. Commun. 8, 17 (2017).

  33. 33.

    Penzkofer, A. & Bugayev, A. A. Two-photon absorption and emission dynamics of bulk GaAs. Opt. Quantum Electron. 21, 283–306 (1989).

  34. 34.

    Celebrano, M. et al. Mode matching in multiresonant plasmonic nanoantennas for enhanced second harmonic generation. Nat. Nanotechnol. 10, 412–417 (2015).

  35. 35.

    Lee, J. et al. Giant nonlinear response from plasmonic metasurfaces coupled to intersubband transitions. Nature 511, 65–69 (2014).

  36. 36.

    Bristow, A. et al. Ultrafast nonlinear response of AlGaAs two-dimensional photonic crystal waveguides. Appl. Phys. Lett. 83, 851–853 (2003).

  37. 37.

    Husko, C. et al. Ultrafast all-optical modulation in GaAs photonic crystal cavities. Appl. Phys. Lett. 94, 021111 (2009).

  38. 38.

    Strauss, U., Rühle, W. & Köhler, K. Auger recombination in intrinsic GaAs. Appl. Phys. Lett. 62, 55–57 (1993).

  39. 39.

    Shah, J. Ultrafast spfectroscopy of semiconductors and semiconductor nanostructures, Vol. 115 (Springer Science & Business Media, 2013).

  40. 40.

    Camacho-Morales, R. et al. Nonlinear generation of vector beams from AlGaAs nanoantennas. Nano Lett. 16, 7191–7197 (2016).

  41. 41.

    Campione, S. et al. Broken symmetry dielectric resonators for high quality factor Fano metasurfaces. ACS Photonics 3, 2362–2367 (2016).

  42. 42.

    Yang, Y., Kravchenko, I. I., Briggs, D. P. & Valentine, J. All-dielectric metasurface analogue of electromagnetically induced transparency. Nat. Commun. 5, 5753 (2014).

  43. 43.

    Corkum, P. B. & Krausz, F. Attosecond science. Nat. Phys. 3, 381–387 (2007).

  44. 44.

    Grahn, P., Shevchenko, A. & Kaivola, M. Electromagnetic multipole theory for optical nanomaterials. New J. Phys. 14, 093033 (2012).

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Acknowledgements

This work was supported by the U.S. Department of Energy, Office of Basic Energy Sciences, Division of Materials Sciences and Engineering and performed, in part, at the Center for Integrated Nanotechnologies, an Office of Science User Facility operated for the U.S. Department of Energy (DOE) Office of Science. Sandia National Laboratories is a multi mission laboratory managed and operated by National Technology and Engineering Solutions of Sandia, LLC, a wholly owned subsidiary of Honeywell International, Inc., for the U.S. Department of Energy’s National Nuclear Security Administration under contract DE-NA0003525. A.V. and I.S. gratefully acknowledge financial support from the German Research Foundation (STA 1426/2-1) and by the Thuringian State Government through its ProExcellence Initiative (ACP2020).

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Author notes

  1. These authors contributed equally: Sheng Liu, Polina P. Vabishchevich.

Affiliations

  1. Sandia National Laboratories, Albuquerque, NM, 87185, USA

    • Sheng Liu
    • , Polina P. Vabishchevich
    • , John L. Reno
    • , Gordon A. Keeler
    • , Michael B. Sinclair
    •  & Igal Brener
  2. Institute of Applied Physics, Abbe Center of Photonics, Friedrich Schiller University Jena, Albert-Einstein-Str. 15, 07745, Jena, Germany

    • Aleksandr Vaskin
    •  & Isabelle Staude
  3. Center for Integrated Nanotechnologies, Sandia National Laboratories, Albuquerque, NM, 87185, USA

    • John L. Reno
    •  & Igal Brener

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Contributions

S.L., I.B. conceived the idea; S.L., J.L.R., and G.A.K. fabricated the sample; P.V., A.V., and S.L. conducted the measurements; all the authors analyzed the data; P.V. prepared the figures; P.V. and S.L. wrote the manuscript with input from all the authors; I.S., M.B.S., and I.B. supervised the project.

Competing interests

The authors declare no competing interests.

Corresponding author

Correspondence to Igal Brener.

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DOI

https://doi.org/10.1038/s41467-018-04944-9

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