1 Introduction
Tm:YAG lasers operating at 2 μm wavelengths have attracted a lot of attention owing to their strong absorption in water, as well as the eye-safe wavelength bands, which have been utilized extensively in soft-material processing, medical diagnostics, direct optical communications, and so on[Reference Mingareev, Weirauch, Olowinsky, Shah, Kadwani and Richardson1–Reference Silva, Teichmann, Cousin, Hemmer and Biegert3]. One of the main challenges is related to the induced laser performance degeneration that arises from waste heat generated inside the crystal, which is detrimental to the cited applications. Increasing the heat dissipation capability and analyzing thermal problems in Tm:YAG lasers are thus critical for laser developers.
Efficient heat removal is realized by increasing the surface-to-volume ratio of the gain medium, as in fiber, slab, and disk lasers[Reference Wu, Yao, Dai and Ju4–Reference Diening, Dicks, Heumann, Huber, Voss, Karszewski and Giesen7]. Among them, disk architectures have several advantages, including efficient cooling capacity, weak nonlinear effect, and power scaling without compromising beam quality[Reference Giesen and Speiser8]. The highest published output power of a Tm:YAG disk laser is 24 W with M Reference Wolter, Pullen, Baudisch, Sclafani, Hemmer, Senftleben, Schröter, Ullrich, Moshammer and Biegert2 value of 11.7 and slope efficiency of 31% when pumped at 785 nm, in which the presence of cross-relaxation (CR) can increase the pump quantum efficiency[Reference Gao, Ma, Xie, Zhang, Luo, Yang, Tang, Ma, Yuan and Qian9, Reference Zhang, Schulze, Mak, Pervak, Bauer, Sutter and Pronin10]. In addition, the use of a 1 μm laser as the pump source has also proved successful in generating 2 μm radiation[Reference Phua, Lai, Wu, Lim and Lau11]. This is a readily available and cost-effective pump method, because the 1 μm laser (e.g., lamp-pumped Nd:YAG laser,Yb3+ doped laser) is commercially mature with high power, high reliability, and mass production.Very recently, an intra-cavity pumped Tm:YAG disk laser in multi-transverse mode operation was reported with an average output power of 760 mW in quasi-continuous wave mode and 17 mW in continuous wave mode[Reference Chen, Wang, Dong, Wang, Chen, Qian, Zhu, Alekse and Zhu12]. The relatively low absorption coefficient of 1 μm laser for a disk-shaped gain medium is compensated by the intra-cavity pumping method[Reference Phua, Lai, Wu, Lim and Lau11].Nevertheless, its poor pumping stability and strong nonlinear coupling can degrade the output laser performances significantly[Reference Hong, Liu, Huang and Gong13, Reference Vorholt and Wittrock14]. It is then difficult to study the operation characteristics of 1 μm pumped Tm:YAG disk laser in detail.
On the other hand, because a high population inversion is necessary to compensate for the limitation of the disk’s thickness, the intensities of transitions in competition, up conversion (UC) and excited state absorption (ESA), cannot be ignored, as is done in rod and fiber-shaped lasers[Reference Wu, Yao, Dai and Ju4]. The enhancement of output power is then limited and more heat is generated in Tm:YAG disk lasers. Therefore, verifying the proportions of all transitions and evaluating their effects on operation characteristics and heat generation are extremely important forTm:YAG disk lasers.
In the present paper, a dual parabolic mirror 20-pass pumping scheme is designed for the1 μm pumped Tm:YAG disk laser. The multi-pass pumping method ensures high pumping stability and efficient thermal management of the gain medium[Reference Huang, Zhu, Zhu, Shang, Wang, Qi, Zhu and Guo15]. This scheme can also enable the measurement of the unabsorbed pump power in real time. The absorption properties of 1 μm pump light are then studied efficiently. In addition, a numerical model considering stimulated emission (SE), fluorescence, non-radiative decay, UC, and ESA is developed to evaluate the proportions and fractional thermal loads of all transitions quantitatively in view of the absorption, output, and temperature properties in this laser.Experimental and theoretical results show that the UC, ESA, and SE compete with each other to consume the1 μm pump photons, and the proportions of UC and ESA are more dominant than that of SE in a1 μm pumped Tm:YAG disk laser, leading the absorbed pump power to decrease abnormally after lasing. The strong UC and ESA effects are the main part of total heat generation for two thicknesses of gain medium. In addition, the small thickness of gain medium with better heat dissipation capacity has relatively weak UC and ESA and low total fractional thermal load, which can improve the output laser performances. Consequently, a 0.5 mm Tm:YAG disk laser delivered an average power of 1.05 W with slope efficiency of 13.2%, and the measurement of it yielded Mx 2 = 2.02 and My 2 = 2.03.
2 Theoretical analysis
The energy diagram of a Tm:YAG crystal is shown in Figure 1, where ${\lambda}_{{P}}$ and ${{\lambda}}_{{L}}$ are the wavelengths of the pump and output laser, respectively.
The Tm3+ ions in the 3H6 state can be promoted to the energy level near the 3H5 state by stimulated absorption (SA), followed by decaying to the 3F4 state via non-radiative transition and CR, thereby lasing at 2 μm and emitting fluorescence. Here ${\lambda}_F^{3F4}$ is the average fluorescence wavelength from the 3F4 to3H6 state and is given by
where $\lambda$ is the wavelength and $\varepsilon \left(\lambda \right)$ is the intensity at the wavelength of $\lambda$. Figure 2 shows the measured fluorescence spectrum of Tm:YAG[Reference Li, Huo, He and Cao16]. Based on Eq.(1), the calculated average fluorescence wavelength is 1901 nm.
In addition to SE, there are two more competing transitions that may also deplete the population inversion of the 3F4 state and increase the absorption of 1 μm photons, depending on the pumping density: UC and ESA. In the former case, an excited Tm3+ ion in the3F4 state is promoted to the 3H5 or 3H4 state via energy transfer processes.In the latter case, an excited Tm3+ ion in the 3F4 state is promoted to the 1G4 state by absorbing two more 1 μm photons, followed by fluorescence and non-radiative decay.The fluorescence decay from the 1G4 state will produce a broad fluorescence emission spectrum. Considering the transition rate and lifetimes of states, the equivalent fluorescence wavelength from 1G4 to lower states(3F2,3, 3H4,3H5, 3F4, and 3H6) is given by
where ${E}_i\;\left(i=1,2,3,4,5\right)$ is the energy for each state and ${\beta}_i^6$ is the fluorescence branch ratio for 1G4 state, as shown in Table 1[Reference Jia, Tu, Li, Zhu, You, Wang and Wu17]. As the fluorescence branch ratio is related to the transition rate and lifetimes of the lower states, its influences have been taken into account in the model[Reference Caird, De Shazer and Nella18]. In addition, the3F2,3, 3H4, and 3H5 states have very short lifetimes and low quantum efficiency, which can make the ${\lambda}_F^{1G4}$ blue-shifted. As a result, the equivalent fluorescence wavelength is calculated as 649.7 nm.
In Figure 1, the processes of heat generation in a Tm:YAG crystal could be divided into the following four parts: quantum defect heating, non-radiative decay heating from the 3F4 state, fluorescence heating from the 3F4 state, and UC- and ESA-induced heating. The heating energy density due to the quantum defect caused by SE can be described as
where $h$ is the Planck constant, ${\upsilon}_P$ is the frequency of the pump photon, ${\upsilon}_L$ is the frequency of the laser photon, and $\Delta n$ is the density of pump photons in laser medium. Here ${\eta}_L$ is the laser extraction efficiency, which is defined as the fraction of absorbed pump photons consumed by SE.
The heat energy density generated by non-radiative decay in the 3F4 state can be described as
where ${\eta}_R^{3F4}$ is the radiative quantum efficiency of the 3F4 state. Meanwhile, the heating energy density caused by fluorescence decay in the 3F4 state can be described as
where ${\upsilon}_F^{3F4}$ is the frequency of average fluorescence wavelength from the 3F4 state to the 3H6 state and ${\eta}_{UC\& ESA}$ is the quantum efficiency of competing transitions (UC and ESA), representing the percentage of upper-level laser particles for UC and ESA. The additional absorption efficiency is then denoted by $\left(1-{\eta}_L\right){\eta}_{UC\& ESA}$, which represents the fraction of absorbed pump photons consumed by UC and ESA transitions. Here $\left(1-{\eta}_L\right)\left(1-{\eta}_{UC\& ESA}\right)\left(1-{\eta}_R^{3F4}\right)$ and $\left(1-{\eta}_L\right)\left(1-{\eta}_{UC\& ESA}\right){\eta}_R^{3F4}$ represent the fraction of absorbed pump photons consumed by non-radiative decay and fluorescence decay in the 3F4 state, respectively.
The UC- and ESA-induced heating includes non-radiative decay heating from the 1G4 state ${Q}_{NR}^{1G4}$ and fluorescence heating from the 1G4 state ${Q}_F^{1G4}$, which can be described as
where ${\eta}_R^{1G4}$ is the radiative quantum efficiency for the 1G4 manifold and${\upsilon}_F^{1G4}$ is the frequency of the equivalent fluorescence wavelength from the1G4 state.
The total fractional thermal load of a Tm:YAG crystal is given by
It is straightforward to show that the first term of Eq. (8) represents laser heating, the second term represents fluorescence heating and non-radiative decay in the 3F4 state, and the third term represents UC- and ESA-induced heating via fluorescence and non-radiative decay in the1G4 state. In addition, the laser extraction efficiency is given by
where ${I}_P$ is the average pump intensity in the crystal, ${I}_L$ is the power intensity of the circulating laser radiation inside the resonator,${M}_R$ is the number of the laser passing through the crystal per resonator round trip,${\alpha}_P$ is the absorption coefficient for pump radiation, and ${g}_L$ is the gain coefficient for laser. When the pump intensity is higher than laser threshold, the laser starts lasing and gives ${g}_L{M}_R=\delta /d$, where $d$ is the thickness of the gain medium. Here $\delta$ is the round trip loss and can be described as
where ${T}_{oc}$ is the output coupler transmission and ${L}_{loss}$ accounts for residual losses, owing to the scattering during one round trip in the resonator. Equation (9) is simplified as
where ${I}_{out}$ is the output power intensity and ${I}_{abs}$ is the absorbed pump power intensity. When the pump intensity is lower than laser threshold, the laser extraction efficiency is zero. The total fractional thermal load is simplified as
Based on the absorbed pump power ${P}_{abs}$ and the total fractional thermal load ${\eta}_h$, the central temperature of Tm:YAG disk is calculated by using the finite element method.The measured temperature data are then fitted with the calculated data by adjusting ${\eta}_{UC\& ESA}$ and ${\eta}_R^{1G4}$. Consequently, the proportions and fractional thermal load of all transitions are derived. Parameters used in the simulation are listed in Table 2.
3 Experimental setup
The experimental setup is shown in Figure 3. A multi-pass pumping scheme consisting of dual parabolic mirrors with a conjugated relationship is designed to send the pump beam through the disk 20 times, and the position of each pump spot on two parabolic mirrors is shown inFigure 3(a). In particular, this scheme enables the unabsorbed pump light to be emitted from the multi-pass pumping head, and it is thus beneficial to evaluate the absorption properties of 1 μm pump light in this laser. In addition, the temperature ofTm:YAG disk was measured by an infrared thermal imager (Testo 890-2) with a resolution of0.1°C.
The Tm:YAG disk crystal was mounted on a water-cooled copper heatsink at 18°C with a doping concentration of 3.5%, and its thickness and pump spot size were 0.5 and 1.7 mm, respectively. In addition, the front surface of the Tm:YAG disk had an antireflection coating at both 1 and2 μm wavelengths, and the back surface had a highly reflective coating in the same wavelength band. The absorption coefficient of Tm:YAG crystal at 1 μm was around 1.37× 10–3 mm–1. Moreover, the range of dioptric power of the 0.5 mm disk was measured as 0.1–0.93 m–1[Reference Chénais, Balembois, Druon, Lucas-Leclin and Georges22]. A V-shaped cavity with large stable area was designed to match the dioptric power. M1 was a concave mirror with curvature radius of 1 m, and it had a high reflectivity at 2 μm. OC1 was a plane output coupler at 2 μm with a transmittance of 1%, which was the optimum transmissivity by measuring the highest output power. The distances between components in the cavity were L 1 = 0.455 m and L 2 = 0.25 m. Meanwhile, a 1 mm thick Tm:YAG disk laser was also analyzed as a comparison, which shared the same coating parameters and doping concentration as the 0.5 mm disk. To realize mode matching in terms of dioptric power of the thick disk, the cavity lengths of two arms were adjusted toL 1 = 0.55 m and L 2 = 0.25 m, respectively. The number of pumping passes and pumped spot size were the same as in the 0.5 mm thickness case. In addition, to study the properties of absorbed pump power and output power, P1 and P2 were used to measure the unabsorbed pump power ${P}_{unabs}$ and output laser power ${P}_{out}$, respectively.
Actually, the pump source can be replaced by any Nd3+- or Yb3+-based laser at~1 μm wavelength, as the absorption of Tm:YAG in the 1 μm spectral region is almost the same (see Figure 4). The spectra of the pump light and output laser were both measured by a spectrometer (waveScan of APE), and the central wavelengths of the pump light ${\lambda}_P$ and laser radiation ${\lambda}_L$ were 1030.9 and 2011.4 nm, respectively.
4 Results and discussion
During the experiments, a Yb:YAG thin disk laser was used as the pump source, and the maximum input pump power of the Tm:YAG disk laser was ${P}_{in}$ = 65.8 W. To prevent disk damage, the pump power was limited such that the disk temperature never exceeded 125°C.
4.1 Operation characteristics of a 1 μm pumped Tm:YAG disk laser
In practice, the reflection of 1 μm laser in the multi-pass pumping scheme is incomplete[Reference Huang, Zhu, Zhu, Shang, Wang, Qi, Zhu and Guo15]. Considering the loss of the multi-pass pumping scheme, the absorbed pump power ${P}_{abs}$ is given by
where ${R}_p$ is the total reflectivity of the Tm:YAG multi-pass pumping scheme with the measured value of 77%.
Figure 5 shows the dependences of absorbed pump power for 0.5 and 1 mm Tm:YAG disk lasers on input pump power under non-lasing and lasing conditions. It can be seen that the absorbed pump power threshold of the 0.5 mm Tm:YAG disk laser is6.9 W. Above the threshold, the laser starts oscillating, and the output power increases linearly with the absorbed pump power, as shown in Figure 6. The maximum output power was 1.05 W with the beam quality of Mx 2 = 2.02, My 2 = 2.03, and the maximum optical-to-optical efficiency and slope efficiency were ${\eta}_{oto}= 4.8\%$ and ${\eta}_{slope} = 13.2\%$, respectively. The corresponding pump quantum efficiency was 25.8%, indicating that only a small portion of the absorbed 1 μm photons were used for emitting 2 μm lasers. At the same time, serious red and blue light was observed in experiments, indicating that the UC and ESA were more dominant than the SE in a Tm:YAG disk laser when pumped by a 1 μm laser.Compared with 0.5 mm disk, the 1 mm thick disk can absorb more pump power. At the input pump power of 38.1 W, the absorbed pump power increases from 11.9 to 16.4 W. However, because the performance of one-dimensional heat flow is poor for the thick-disk case, the 1 mm thick disk has a higher temperature than the 0.5 mm disk at the same absorbed pump power, and thereby a higher threshold of8.5 W. The output laser performances are also degraded, as presented in Figure 6.
On the other hand, the absorbed pump power of the Tm:YAG disk is significantly different under lasing and non-lasing conditions, as shown in Figure5. Under lasing condition, the absorbed pump power of Tm:YAG decreases
obviously for both 0.5 and 1 mm thicknesses of gain medium. This abnormal phenomenon is very interesting, and shows us the dynamic absorption properties of 1 μm pump light for a Tm:YAG disk before and after lasing, which is equivalent to the consumption of population inversion on the upper laser level. In general, the depletion of upper laser level induces an increased absorption of pump light for a laser medium with simple energy level, e.g., Yb:YAG orNd:YAG[Reference Volkov, Kuznetsov and Mukhin23]. However, the Tm:YAG crystal shows the abnormal changes of absorbed pump power when pumped by the 1 μm light. This is attributed to the significant UC and ESA effects. To show the operation characteristics of1 μm pumped Tm:YAG disk laser clearly, an operating principle diagram under non-lasing and lasing conditions is presented in Figure 7. The absorbed pump power of Tm:YAG mainly consists of two parts: direct absorption via SA and CR, and additional absorption via UC and ESA. Above the laser threshold, the SE, UC, and ESA compete with each other to consume the population inversion on the 3F4 state, and this shows the dynamic absorption properties of the pump light. Under the non-lasing condition, no SE occurs, and the significant UC and ESA effects allow high absorption of the 1 μm laser. At the input pump power of 57.8 W, the absorbed pump power of the 0.5 mm disk was 22.5 W. Under the lasing condition, the generation of SE makes the direct absorbed pump power increase due to the depletion of the 3F4 state. However, the consumption of population inversion on the 3F4 state can suppress the intensities ofUC and ESA. The additional absorbed pump power, which is used for UC and ESA, decreases accordingly. As the intensities of UC and ESA were more dominant than that of SE, the absorbed pump power of the gain medium was decreased to 18.7 W. On the other hand, the increased temperature of Tm:YAG is mainly caused by the UC and ESA when pumped by 1 μm light, and the temperature of Tm:YAG thus drops from 121.1 to91.1°C after lasing at 2 μm, as shown in Figure7.
4.2 Evaluation intensities of UC and ESA by calculating ${\eta}_{UC\& ESA}$ and ${\eta}_R^{1G4}$
As mentioned previously, the Tm:YAG disk laser has significant UC and ESA, which has been described qualitatively. In this section, the intensities of UC and ESA are evaluated quantitatively by calculating${\eta}_{UC\& ESA}$ and ${\eta}_R^{1G4}$. The finite element method is used to calculate the central temperature of the gain medium on account of ${P}_{abs}$ and ${\eta}_h$. The additional absorption efficiency ${\eta}_{UC\& ESA}$ and radiative quantum efficiency for the 1G4 manifold${\eta}_R^{1G4}$ are obtained from a least-squares fit to the measured temperature data.
The dependences of central temperature for a 0.5 mm Tm:YAG disk laser on absorbed pump power are shown in Figure 8(a). When the absorbed pump power is below 0.1 W, the power density is <240 W/cm3, which is less than the ESA threshold[Reference Phua, Lai, Wu, Lim and Lau11, Reference Chen, Wang, Dong, Wang, Chen, Qian, Zhu, Alekse and Zhu12]. The ESA effect can then be neglected, i.e., ${\eta}_{UC\& ESA}$= 0. When the absorbed pump power is above the ESA threshold, the best fit to data gives ${\eta}_{UC\& ESA}$ = 99.6% and ${\eta}_R^{1G4}$ = 0.3% for the crystal by using the finite element method. The calculated central temperature can be obtained based on the thermal load model. It can be seen that the temperatures of Tm:YAG disk are directly proportional to the absorbed pump power, and are significantly different under lasing and non-lasing conditions. Under lasing condition, the intensities ofUC and ESA, denoted by $\left(1-{\eta}_L\right){\eta}_{UC\& ESA}$, are decreased due to the increased laser intensity ${\eta}_L$ via SE. As the increased temperature of Tm:YAG is mainly caused by the UC and ESA when pumped by 1 μm light[12], the maximum temperature of Tm:YAG is thus decreased from122.3°C to 108.5°C at the absorbed pump power density of 2.0 kW/cm3. Moreover, the central temperature of a 1 μm pumped Tm:YAG disk crystal was comparable with the 785 nm pumped case, where the disk temperature of 150°C was reached at an absorbed pump power density of 3.1 kW/cm3[Reference Zhang, Schulze, Mak, Pervak, Bauer, Sutter and Pronin10]. This is due to the fact that the UC and ESA effects are significant for both 785 nm and1 μm pumped Tm:YAG disk lasers.
On the other hand, when the absorbed pump power is above the ESA threshold(0.2 W of absorbed pump power), the 1 mm thick disk exhibits approximately ${\eta}_{UC\& ESA}~=~99.7\%$ and ${\eta}_R^{1G4} = 0.2\%$ by using the same method. As the heat dissipation of the 1 mm thick disk is lower than the 0.5 mm disk, the temperature of the 1 mm thick disk is much higher than in the0.5 mm case at the same absorbed pump power, as shown in Figure 8(b). At the input pump power of 38.1 W, the central temperature of the gain medium has increased by 50% from 70°C to 105°C. In addition, the intensity of UC and ESA for the 1 mm thick disk is higher than in the 0.5 mm case at the same absorbed pump power, and this is attributed to the weaker intensity of SE for the 1 mm thick disk, as shown in Figure 6.
To clarify the dynamic variation of UC and ESA intensities in Tm:YAG disk lasers, the proportions of all heating factors were calculated, as shown in Figure 9. When the absorbed pump power is below the ESA threshold (0.1 W for the 0.5 mm disk case or 0.2 W for the 1 mm disk case), the proportions of laser, UC, and ESA are zero. The fluorescence and non-radiative decay from the 3F4 state are dominant with values of 98% and 2%, respectively. At the same time, the fractional thermal loads of fluorescence and non-radiative decay from the 3F4 state are 5.48% and 2%, respectively, as shown in Figure 10. When the absorbed pump power is above the ESA threshold, the effects of fluorescence and non-radiative decay from the3F4 state are quite weak. For the 0.5 mm thickness of gain medium, when the pump power density is lower than the laser threshold, the proportion of UC and ESA effects is 99.6%. This is due to the fact that the absorbed pump power density at this stage is much higher than theoretically required for the onset of significant UC and ESA[Reference Jackson and King24]. Therefore, the UC and ESA effects are extremely strong.Based on above analysis, the radiative quantum efficiency for the 1G4 state${\eta}_R^{1G4}$ is only 0.3%, indicating that the UC- and ESA-induced heating in the Tm:YAG disk laser is mainly through non-radiative decay. As shown in Figure 10(a), the fractional thermal load of the gain medium is over 99%. When the absorbed pump power is higher than the laser threshold, the UC and ESA effects are partly suppressed by the increased laser intensity. The UC- andESA-induced heating is decreased accordingly. In addition, the total fractional thermal load of the gain medium is also decreased, resulting in the temperature of the Tm:YAG disk dropping after lasing, as shown in Figure 8(a). With the further increase of the absorbed pump power, the competition between laser, UC, and ESA will tend to be balanced because of the saturation of optical-to-optical efficiency.
On the other hand, the tendencies of the 1 mm Tm:YAG thick disk are similar to the 0.5 mm case over the range of absorbed pump power. At the absorbed pump power of 16.5 W, the laser proportion of the 1 mm thick disk is 19%, which is lower than that of the 0.5 mm disk, in which a laser proportion of 24% is delivered. Conversely, compared with the 0.5 mm disk, the proportion of UC andESA for the 1 mm Tm:YAG disk increases from 75% to 82%, indicating that the 1 mm Tm:YAG disk has higher UC- and ESA-induced heating, thereby a higher total fractional thermal load. The higher heat generation, as well as poorer heat dissipation capacity, makes the temperature of the 1 mm thick gain medium much higher than that of the 0.5 mm case at the same absorbed pump power, as shown inFigure 8. Therefore, we expect that the Tm:YAG disk with lower thickness and better heat dissipation capacity can achieve higher power and efficiency via this scheme.
5 Conclusion
In summary, we have reported a 2 μm Tm:YAG disk laser pumped by a 1 μm laser via a 20-pass pumping scheme. This scheme enables the evaluation of absorption, output, and temperature properties. The competitive transitions of UC and ESA particularly challenge the scaling of output powers for 2 μm disk lasers. To analyze the effects of UC and ESA, a numerical model accounting forSE, fluorescence, non-radiative decay, UC, and ESA has been developed. More broadly, the proportions and fractional thermal loads of all transitions have been derived quantitatively based on the model.Experimental and theoretical results show that the UC and ESA effects are dominant in 1 μm pumped Tm:YAG disk lasers, leading the absorbed pump power to decrease abnormally after lasing. The strongUC and ESA are the main sources of total heat generation of the gain medium. In addition, although theTm:YAG disk with small thickness has a lower absorbed pump power, its higher heat dissipation capacity enables the relatively weak UC and ESA and low total fractional thermal load, which are conducive to the promotion of laser performance. As a result, the 0.5 mm Tm:YAG disk has a maximum output power of1.05 W, limited only by the available pump power, and the measurement of it yielded Mx 2 = 2.02, My 2 = 2.03. Finally, this model can be used for any Tm3+-doped disk laser, which lays the groundwork for analyzing the operation characteristics and evaluating the dynamic processes of all transitions for disk-shaped Tm3+-doped lasers. Further reducing the thickness of the gain medium, together with increasing pump number and spot size, will be propitious to scaling the Tm3+ disk lasers’ output power without compromising beam quality and mode stability in the near future.
Acknowledgments
This work was supported by the National Natural Science Foundation of China (NSFC, No. 61975060) and the Fundamental Research Funds for the Central University (HUST, No. 2016YXMS213).