Abstract
In this paper, both nonlinear saturable absorption and two-photon absorption (TPA) of few-layer molybdenum diselenide (MoSe2) were observed at 1.56 μm wavelength and further applied to mode-locked ultrafast fiber laser for the first time to our knowledge. Few-layer MoSe2 nanosheets were prepared by liquid-phase exfoliation method and characterized by x ray diffractometer, Raman spectroscopy, and atomic force microscopy. The obtained few-layer MoSe2 dispersion is further composited with a polymer material for convenient fabrication of MoSe2 thin films. Then, we investigated the nonlinear optical (NLO) absorption property of the few-layer MoSe2 film using a balanced twin-detector measurement technique. Both the saturable absorption and TPA effects of the few-layer MoSe2 film were found by increasing the input optical intensity. The saturable absorption shows a modulation depth of 0.63% and a low nonsaturable loss of , corresponding to the relative modulation depth of 18%. The TPA effect occurred when the input optical intensity exceeds . Furthermore, we experimentally exploit the saturable absorption of few-layer MoSe2 film to mode lock an all-fiber erbium-doped fiber laser. Stable soliton mode locking at 1558 nm center wavelength is achieved with pulse duration of 1.45 ps. It was also observed that the TPA process suppresses the mode-locking operation in the case of higher optical intensity. Our results indicate that layered MoSe2, as another two-dimensional nanomaterial, can provide excellent NLO properties (e.g., saturable absorption and TPA) for potential applications in ultrashort pulse generation and optical limiting.
© 2015 Chinese Laser Press
1. INTRODUCTION
Nonlinear optical (NLO) responses can play an important role in light–matter interaction, and have attracted intense interest for use in versatile photonic and optoelectronic applications [1]. Optical materials under high-intensity laser field can show some fantastic NLO effects, including nonlinear absorption [2], Kerr nonlinearity, and Raman/Brillouin scattering [3,4]. Among them, nonlinear absorption effect (e.g., saturable [5–10] and multiphoton [11,12] absorption) is always one of most important and intensive research topics. For example, saturable absorption is usually used to generate short laser pulses by passive mode-locking [13–20] or -switching [21–24] techniques. Multiphoton absorption can be very useful for applications in optical limiting [25] and fluorescence microscopy [26]. Generally, these NLO responses are extremely dependent on the optical materials themselves. Therefore, there is always great interest in developing new NLO materials.
Recently, it was found that two-dimensional (2D) materials (e.g., graphene [7,11]) can possess extraordinary NLO properties. Graphene, as the first-discovered 2D nanomaterial, has impressively exhibited strong NLO responses with a large nonlinear refractive index ( [27]) and low saturable optical intensity of [7]. The nonlinear saturable absorption of graphene has been widely used to mode--switch lasers for short-pulse generation [28–36], and the Kerr nonlinearity (e.g., four-wave mixing) of graphene has also been applied to wavelength conversion [37].
The success of graphene has triggered a worldwide upsurge in research interest in 2D nanomaterials. In recent years, some new 2D materials [e.g., topological insulators (TIs)] have been successively discovered [38–47]. In particular, atomically thin group VIB transition metal dichalcogenides (TMDs; ; , Mo; , Se), as a new class of 2D materials, have recently stimulated a great deal of research due to their unique and exotic properties. TMDs possess bandgap tunability by reducing the layer number or introducing the defects [48], high carrier mobility, and strong spin-orbit coupling, making them appealing materials for various applications in electronics and optics. Recent experiments have demonstrated that layered molybdenum diselenide () has broadband saturable absorption from 400 to [10,48], and exhibits a nonlinear refractive index () [49]. Furthermore, mode-locking and -switching operations based on layered have been achieved at around 1, 1.5, and 2 μm [50–55]. However, it should be noted that most studies on the TMDs were focused on until now, and other TMDs (e.g., ) have not yet been fully investigated. Thin-layered actually possesses more attractive properties compared with , including narrower bandgap between 1.1 eV (indirect) and 1.5 eV (direct) [56], lower optical absorption coefficient [49], and larger spin-splitting energy of at the top of the valence bands. The narrow bandgap and low optical absorption coefficient could make more applicable than to broadband saturable absorption for passively mode-locked lasers.
In this paper, we experimentally investigated the NLO absorption of few-layer at 1.56 μm wavelength and further demonstrated a passively mode-locked Er-doped fiber (EDF) soliton laser. Few-layer was fabricated by the liquid-phase exfoliation (LPE) method and then embedded in polymer composite, constructing few-layer films. Using a balanced twin-detector measurement system, the film exhibited saturable absorption with a relative modulation depth of 18% and two-photon absorption (TPA) under the input optical intensity of . Furthermore, a mode-locked Er-doped fiber laser (ML-EDFL) based on a few-layer film as saturable absorber (SA) was successfully achieved. The mode-locking operation could stably generate transform-limited pulses with a 1.45 ps duration, and was also interrupted by TPA under higher pumping level.
2. PREPARATION AND CHARACTERIZATION OF
A. Few-Layer Fabricated by the LPE Method
The few-layer used in our experiment was prepared by the LPE method [57]. The LPE process for obtaining thin-layered 2D materials has two steps. Namely, bulk material is first mixed with a solvent and then sonicated under strong ultrasound field for overcoming the interlayer van der Waals forces. In this process, it is very key that a suitable solvent is chosen for easily exfoliating bulk crystals and stabilizing thin-layered material. It is required that the solvent surface energy be similar to the exfoliated material (e.g., ). N-methyl-pyrrolidone, chitosan acetic, and solutions were widely used to exfoliate graphene, TIs, and [38,44,50,55], but these solvents could be harmful to human health. In contrast, lysine is indispensable to human body and its surface energy is close to . Therefore, we used lysine as the dispersant to exfoliate and stabilize in our experiment. Initially, the bulk (325 mesh power, Alfa Aesar) was added into the lysine solution and sonicated for 20 h to produce the few-layer suspension. The exfoliated suspension was centrifuged for 30 min at 1000 rpm to remove bulk . Subsequently, the supernatant was decanted to another centrifuge tube. After centrifuging the supernatant at 13,000 rpm for 30 min to remove free lysine, the as-obtained product was collected into vials.
B. Characterization of Few-Layer
After exfoliation, the color of solution was deepened, manifesting that the exfoliated had been well dispersed in lysine solution [Fig. 1(a)]. The purchased bulk was first characterized by x ray diffraction (XRD). As shown in Fig. 1(b), all labeled peaks of the bulk material can be readily indexed to rhombohedral (JCPDS no. 29-0914). Then, we measured the XRD pattern of the exfoliated . As given in Fig. 1(b), the high [002] orientation still exists and some characteristic peaks disappeared (compared to bulk structure), indicating that bulk had been successfully exfoliated as we expected. The thickness of the as-prepared few-layer was also characterized by atomic force microscopy (AFM), as shown in Fig. 1(c). The average thickness from the height profile diagram [inset of Fig. 1(c)] was measured to be . This indicates that the exfoliated nanosheets are around 2–3 layers, because the single-layer thickness of is about 0.8 nm [56]. In addition, it is well known that the location of Raman modes can also determine the thickness of 2D materials. Therefore, we further measured the Raman spectra [Fig. 1(d)] of before and after exfoliation. We observed the prominent Raman mode, which is associated with the out-of-plane vibration of Se atoms. As shown in Fig. 1(d), the Raman mode of the as-exfoliated is redshifted slightly, also confirming the few-layered structure of the as-prepared [58]. Actually, the redshift phenomenon has been reported in other 2D materials (e.g., graphene, TIs, ), possibly originating from the decreasing the van der Waals forces between layers.
3. NLO ABSORPTION OF FEW-LAYER
To flexibly use the as-prepared for practical applications, the polyvinyl alcohol (PVA) polymer was further dispersed into the few-layer solution. Therefore, the PVA film can be easily formed and transferred onto a fiber end-facet for constructing a fiber-compatible device (see the sample in Fig. 2).
Then, we measured the NLO absorption of the fiber-compatible device using the balanced twin-detector measurement system (Fig. 2). The system consists of a femtosecond seed laser, erbium-doped fiber amplifier (EDFA), tunable optical attenuator, coupler, and two optical powermeters. The seed laser from a homemade passively mode-locked fiber laser has a center wavelength of 1566 nm, pulse duration of , repetition rate of 22.15 MHz, and average output power of . When amplified by the EDFA, the optical power could reach , and the pulse duration was slightly broadened to . The amplified power was further divided by the coupler and the 50% optical power could be injected into the few-layer film (the other 50% being the reference beam). The tunable attenuator was used to continuously change the input optical intensity () into the film. The maximum optical intensity into the film can be . As we increased the input optical intensity from 0.3 to , we recorded the optical absorbance of the few-layer film. As shown in Fig. 3, the optical absorbance gradually reduces from 4.20% to 3.57% in the initial stage, but sharply increases when the input optical intensity is more than . The experimental data at the input optical intensity can be well fitted by the formula
Here, , , and represent the modulation depth, saturated optical intensity, and the nonsaturable loss, respectively. This clearly indicates that the saturable absorption behavior happens at , and has , , and a low nonsaturable loss . The normalized modulation depth can be calculated to be , comparable to that of graphene [7], TIs [41], and [52]. It is well known that, from the bulk to single-layer , the energy gap of is between 1.1 eV (1.12 μm) and 1.5 eV (0.82 μm). It is noted that the 1.56 μm photon energy is less than the bandgap of , and one could question why the few-layer has saturable absorption at the longer 1.56 μm wavelength. Similar to the few-layer reported previously [48–55], the saturable absorption of few-layer at 1.56 μm can be well understood as being due to the following possible reasons: (1) the defects induced by the LPE fabrication process [48], and (2) the edge-state or surface absorption [55] (i.e., the coexistence of both semiconducting and metallic phases) [51–54].
Interestingly, we found that the experimental data at can be well fitted by the quadratic equation as follows:
This shows that the TPA process in the few-layer has been excited under the higher optical intensity, and the TPA coefficient is . Note that the increasing of optical absorbance can be attributed to the TPA rather than the thermal damage of the samples. This can be confirmed by the -based mode-locking operation features, and the reason will be further analyzed.4. PASSIVELY MODE-LOCKED FIBER SOLITON LASER
In this section, we will try to further exploit the NLO absorption effects (Fig. 3) of the few-layer for laser application. The saturable absorption characteristic of few-layer will especially be used for a passively mode-locked fiber laser.
A. Experimental Setup
Figure 4 shows the experimental setup of the EDFL passively mode-locked by the few-layer film. A 974 nm laser diode (LD) is used to pump a section of 4.6 m EDF (Nufern, EDFC-980-HP) through a 975/1550 nm wavelength division multiplexer. The EDF has an absorption coefficient of at 980 nm and group velocity dispersion (GVD) of at 1550 nm. The as-fabricated few-layer device in the cavity acts as SA for passive mode locking. A polarization-independent isolator ensures the unidirectional laser operation. A polarization controller (PC) is used to fine tune the cavity birefringence for optimizing the mode-locking operation. A 10/90 optical coupler extracts 10% intracavity signal as laser output. In addition, a section of 15 m single-mode fiber with GVD of at 1550 nm is used for ensuring the cavity operating in the anomalous dispersion region. The total cavity length is about 26 m, with net cavity dispersion of . For measuring the laser outputs, the laser optical spectrum was monitored by an optical spectrum analyzer (HP 70951B), and a 10 GHz InGaAs photodetector (Nortel PP-10G-FAC) together with a 1 GHz digital oscilloscope used to detect the pulse trains and pulse waveforms. Moreover, the radio frequency (RF) output characteristics of the laser pulses were observed by a RF spectrum analyzer (Gwinstek GSP-930, 9 kHz–3 GHz), and the pulse duration was measured by an autocorrelator (FR-103XL, Femtochrome Research Inc.).
B. Experimental Results and Discussions
Because the net GVD of the cavity is anomalous, it can be expected that the ML-EDFL emits soliton pulses by the interplay between anomalous cavity dispersion and the fiber nonlinear Kerr effect. In our experiment, the laser oscillation started initially at continuous-wave (CW) regime at a low pump threshold of 5.5 mW. Then, the CW operation transited to a pulsed regime when the pump power exceeded 10.0 mW. Moreover, as we gradually increased the pump power from 10 to 30.2 mW, we found that the pulse repetition rate enlarged and pulse duration decreased, exhibiting the typical features of passive switching [21]. Actually, such passive switching under the lower pump power was observed usually in some passively mode-locked fiber lasers previously reported [18], mainly resulting from the few number of oscillating longitudinal modes and the insufficient nonlinearity in low pumping intensity. At the pump power of 17.4 mW, Fig. 5 gives the typical characteristics of the passive switching. The -switched optical spectrum [Fig. 5(a)] has a center wavelength of 1558.25 nm and a narrow 3 dB bandwidth of 0.28 nm. The typical oscilloscope trace [Fig. 5(b)] shows that the -switched pulse trains with an uniform pulse intensity have a periodic interval of 101 μs (corresponding to the repetition rate of 9.9 kHz). The inset of Fig. 5(b) further gives the single pulse envelope. The Gaussian-profile pulse has a pulse duration as broad as . The low repetition rate (kHz) and the relative broad pulses also suggest the occurrence of passive switching.
We interestingly found that, once the pump power is more than 30.3 mW, the passive -switching operation became unstable and could abruptly evolve into the mode-locking regime. Stable self-started mode-locking could be readily achieved by slightly adjusting the PC in the cavity. At the pump power of 33.4 mW, we measured the typical optical spectrum of this mode locking with a spectral resolution of 0.08 nm. As shown in Fig. 6(a), the mode-locked optical spectrum (solid line) was obviously broadened, compared with the passive -switching one (dashed line). This implies that the mode-locking operation excited more longitudinal modes and also induced stronger optical nonlinearity in the laser. The mode-locking operation has a center wavelength of 1558.25 nm and a wide 3 dB bandwidth of 1.76 nm. Meanwhile, we clearly observed the symmetrical Kelly sidebands originating from the spectral interference of dispersive waves, manifesting that this operation was at the conventional solitary mode locking [59]. Moreover, the absence of additional narrow spectral peak also suggests that the soliton mode locking almost has no CW component. As shown in Fig. 6(b), we also measured the mode-locked pulse trains at the same pump power of 33.4 mW. The pulse interval of 124.5 ns matches well with the cavity roundtrip time (i.e., the cavity length of ), suggesting that only one soliton was generated per roundtrip. Furthermore, once the stable mode locking was obtained under the initial adjustment of the PC, we found in our experiment that the single soliton operation was always observed so long as the passive mode-locking state is not interrupted.
As shown in Fig. 7, the mode-locking operation at the pump power of 33.4 mW was further characterized by the RF spectrum analyzer and the autocorrelator. Figure 7(a) gives the output RF spectrum of the mode-locked pulses at the fundamental frequency peak for a scanning range of 50 kHz and RF resolution bandwidth of 10 Hz. The fundamental RF peak locates at 8.028 MHz, corresponding to the fundamental cavity repetition rate. This further confirms the occurrence of the passive mode locking. The RF signal-to-noise ratio (SNR) is more than 61.5 dB. We also measured the broadband RF spectrum with a large frequency span of 600 MHz. As can be seen in Fig. 7(b), the measured RF peaks from the 2nd- to 74th-order harmonic exhibit almost uniform intensity without spectral modulation. Both the higher RF SNR () and the absence of modulation in the 600 MHz broad RF spectrum evidently indicate the good stability and CW mode-locking state of the proposed ML-EDFL. Figure 7(c) shows the measured autocorrelation trace of the mode-locked pulses with a narrow scanning range of 32 ps and time resolution of 100 fs. The full width at half maximum (FWHM) of the pulse was measured to be 2.23 ps. If the fit of pulse shape is assumed, the corresponding pulse duration () is 1.45 ps. The time–bandwidth product (TBP) of the mode-locked pulses can be further calculated by the equation
where , , and represent the light speed, center wavelength, and 3 dB bandwidth of the mode-locked optical spectrum. In our experiment, these parameters are , , and , respectively. Therefore, the TBP of the mode-locked pulses is . This manifests that the soliton mode locking of the proposed ML-EDFL generated the transform-limited pulses. Furthermore, an autocorrelation trace with a broad scanning range of 800 ps is given in Fig. 7(d). Note that no pedestal was shown on the autocorrelation trace [Fig. 7(d)], which reveals the excellent quality of the mode locking.As we increased the pump power from 0 to 75 mW, we also recorded the average output power of the laser. One can see from Fig. 8(a) that the laser operation underwent four phases as follows: (1) the CW regime (pump power ); (2) the passive -switching regime (pump power in the range of ); (3) the soliton mode-locking regime (pump power from 30.3 to 73.5 mW); and (4) the CW regime (pump power ). The maximum average output power for passive mode locking is 440 μW, corresponding to the maximum pulse energy of 54.8 pJ. The obtained pulse energy is close to the theoretical calculation value of limited pulse energy () for a single soliton based on the formula [60]
Here, and represent the nonlinear coefficient and the average dispersion of the laser cavity. In addition, one could question why the soliton mode locking degenerated in the case of pump power (i.e., output average power ), and was even extinguished with pump power . This phenomenon should be attributed to the TPA process of the few-layer under intracavity high peak intensity. As shown in Fig. 3, when the optical intensity injected into the few-layer film exceeds , the SA performance becomes worse and the TPA process happens. In our experiment, when the output average power exceeds 400 μW, the intracavity power injected into the few-layer film is more than 4 mW with 1.45 ps pulse duration, corresponding to the input optical intensity of . Therefore, once the pump power is above 50 mW, TPA of the few-layer film happens and the SA-based passive mode locking becomes worse. Decreasing the pump power from 75 mW to 0, we found in our experiment that the ML-EDFL exhibited optical bistability. Namely, when turning on or off the pump power, the processes of the laser operation are very different, as shown in Figs. 8(a) and 8(b). Laser operation with the decrease of pump power only underwent two phases, i.e., the soliton mode-locking (pump power from 73.5 to 8.5 mW) and CW regime (pump power ). Optical bistability has usually been observed in passively mode-locked fiber lasers based on other SAs (e.g., graphene [61] or TIs [41]), or the nonlinear amplifying loop mirror [62] or nonlinear polarization rotation techniques [63,64]. Komarov et al. [65,66] have numerically demonstrated that the optical bistability between the CW and mode-locked regimes is a common feature in fiber lasers independently of the exact optical configuration. Moreover, they also claimed that the mode locking would occur when the nonlinear transmission of the SA works as a positive feedback. The positive feedback means that the greater intensity produces the lower losses. In our experiment, when the fiber laser operated under the CW condition, the intracavity power intensity was much lower than that of mode-locking operation with the same pump power. Namely, the nonlinear loss caused by the SA is relatively larger than that of mode-locking operation. In order to initiate the mode locking from CW based on the saturable absorption of SAs, higher pump power is needed. Then the bistability can be observed in the fiber laser, which is in accordance with the numerical analyses [65,66] and experimental results [41,61–64].In order to evaluate the long-term stability of the passive mode locking, we recorded the mode-locked optical spectrum in 10-min intervals for 70 min at the fixed pump power of 33.4 mW. Figure 9 gives the eight series of spectral data. Neither the central wavelength drift nor the power variation was significantly observed, further confirming that the mode-locked operation possesses good long-term stability.
5. CONCLUSION
We propose a new SA material, , for efficient mode locking of an EDFL. In our experiment, bulk is exfoliated to a few-atomic-layer structure by the liquid phase exfoliation method. Then, the few-layer is composited with PVA to construct PVA– film as a fiber-compatible SA. The SA is measured to have a modulation depth of 0.63% and a nonsaturable loss of 3.5% (i.e., the relative modulation depth of 18%). When inserting the SA into an EDFL, stable mode locking is initiated to emit soliton pulses with duration of 1.45 ps. Moreover, the TPA of the few-layer has also been observed, and we found that the TPA could significantly influence the mode-locking operation. The experimental results show that apart from , few-layer , as one of the atomic-layered TMDs, can also serve as a potential SA for ultrafast photonics.
Acknowledgement
This work was supported partially by the National Science Foundation of China (61475129, 61177044, 61107038, and 61275050), and also by the Project for Undergraduates’ Innovation and Undertaking in Xiamen University (0630-ZX11A1).
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