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厄米-高斯光束在诸多前沿科学领域都有着重要的应用. 不同于目前普遍采用的晶体端面离轴泵浦方式, 本文提出了一种利用板条激光器产生厄米-高斯激光束的方法. 采用半导体激光阵列大面正交泵浦板条激光介质, 具有大模场特性. 根据预先设计的谐振腔模场, 在板条厚度和宽度方向分别采用尺寸可调的光阑限模. 由于高阶模式对谐振腔腔镜不对准的灵敏度弱于低阶模式, 可通过耦合输出镜倾斜量的控制, 实现不同阶数模式腔内损耗的差异化调控, 从而产生各阶次的高纯度厄米-高斯光束. 利用Nd:YAG板条激光器, 获得了0—9阶一维厄米-高斯光束, 其光强分布与理论值的相关系数
$ \rho $ 高于0.95, 光束质量因子$ {M}^{2} $ 与理论值符合良好. 最高阶HG09模式的输出功率为 244 mW. 在此基础上, 进一步利用柱透镜对组成的像散模式转换器, 实现了各阶厄米-高斯光束向对应拉盖尔-高斯光束的转换. 结合板条放大器结构, 基于本方案产生的厄米-高斯光束具备功率定标放大的前景.Hermite-Gaussian (HG) beams have many important applications in the optical frontier, and the limited output power of the high-purity HG beams is partly due to the small gain volume of the mode. The commonly used off-axis end-pumped scheme offers a narrow gain volume whose diameter is about a hundred microns. In this work, a new method of generating the HG beams based on a slab resonator that has a large mode volume is proposed and experimentally demonstrated. According to the optical resonator theory, the intra-cavity modes in thickness and width direction of the slab resonator are restricted by inserting two size-adjustable apertures, respectively. The one-dimensional HG beam generation is mainly guaranteed by the size of the aperture along the thickness direction of the slab, which matches the diameter of the fundamental mode. The different order one-dimensional HG beams are obtained by refined intra-cavity mode modulation. Since the higher-order modes are less sensitive to the misalignment of the cavity mirror than the lower-order modes, and the manipulation of the modes-loss at different orders is achieved by combining the tilt control of the coupled output mirror and the size control of intra-cavity apertures. By adjusting the optical gain and loss in the resonant cavity, the single mode wins the competition of laser modes. Therefore, high-purity one-dimensional HG beams with 0 to 9 orders (HG00 to HG09) are generated. The pump module is comprised of a two-dimensional laser diode array which offers face-pumping to the large surface of the slab, therefore the width of the mode volume is extended to several millimeters. By further incorporating the 100mm-level long slab, the total gain volume is much larger than the counterpart in the off-axis pumping scheme. In this work, the output power of the highest order HG09 mode increases up to 244 mW. Owing to the large gain volume and uniform gain distribution caused by the face-pumped slab, the purity of high order HG modes is quite good. The correlation coefficient$ \rho $ between the measured intensity distribution and the theoretical value is larger than 0.95. The beam quality factor$ {M}^{2} $ is also in good agreement with the theoretical one. Finally, a conversion from Hermite-Gaussian beams to the donut-shaped Laguerre-Gaussian beams is realized by using an astigmatic mode converter. Hopefully, power scaling of the HG beam output is also expected by employing cascaded slab amplifiers, and the approach in this paper provides a novel solution for generation of high power HG beams.-
Keywords:
- Hermite-Gaussian beam /
- slab laser /
- large mode volume /
- tilt control /
- power scaling
[1] Kogelnik H, Li T 1996 Appl. Opt. 5 1550Google Scholar
[2] Sayan Ö F, Gerçekcioğlu H, Baykal Y 2020 Opt. Commun. 458 124735Google Scholar
[3] Meyrath T P, Schreck F, Hanssen J L, Chuu C S, Raizen M G 2005 Opt. Express 13 2843Google Scholar
[4] Wadhwa J, Singh A 2019 Phys. Plasmas 26 062118Google Scholar
[5] Ghotra H S, Jaroszynski D, Ersfeld B, Saini N S, Yoffe S, Kant N 2018 Laser Part. Beams 36 154Google Scholar
[6] Beijersbergen M W, Allen L, van der Veen H E L O, Woerdman J P 1993 Opt. Commun. 96 123Google Scholar
[7] Chu S C, Ohtomo T, Otsuka K 2008 Appl. Opt. 47 2583Google Scholar
[8] Ohtomo T, Chu S C, Otsuka K 2008 Opt. Express 16 5082Google Scholar
[9] Shen Y, Meng Y, Fu X, Gong M 2018 Opt. Lett. 43 291Google Scholar
[10] Coullet P, Gil L, Rocca F 1989 Opt. Commun. 73 403Google Scholar
[11] Allen L, Beijersbergen M W, Spreeuw R J C, Woerdman J P 1992 Phys. Rev. A 45 8185Google Scholar
[12] Romero J, Leach J, Jack B, Dennis M R, Franke-Arnold S, Barnett S M, Padgett M J 2011 Phys. Rev. Lett. 106 100407Google Scholar
[13] Gecevičius M, Drevinskas R, Beresna M, Kazansky P G 2014 Appl. Phys. Lett. 104 231110Google Scholar
[14] Hamazaki J, Morita R, Chujo K, Kobayashi Y, Tanda S, Omatsu T 2010 Opt. Express 18 2144Google Scholar
[15] Gu Y, Gbur G 2010 Opt. Commun. 283 1209Google Scholar
[16] Ohtomo T, Kamikariya K, Otsuka K, Chu S C 2007 Opt. Express 15 10705Google Scholar
[17] 连天虹, 王石语, 寇科, 刘芸 2020 69 114202Google Scholar
Lian T H, Wang S Y, Kou K, Liu Y 2020 Acta Phys. Sin. 69 114202Google Scholar
[18] Chu S C, Chen Y T, Tsai K F, Otsuka K 2012 Opt. Express 20 7128Google Scholar
[19] Delaubert V, Shaddock D A, Lam P K, Buchler B C, Bachor H A, McClelland D E 2002 J. Opt. A: Pure Appl. Opt. 4 393Google Scholar
[20] Ma L, Guo H, Sun H, Liu K, Su B, Gao J 2020 Photonics Res. 8 1422Google Scholar
[21] Hu A, Lei J, Chen P, Wang Y, Li S 2014 Appl. Opt. 53 7845Google Scholar
[22] Li S, Guo Y D, Chen Z Z, Zhang L, Gong K L, Zhang Z F, Xu Z Y 2019 Chin. Phys. Lett. 36 044204Google Scholar
[23] Boyd G D, Gordon J P 1961 Bell Syst. Tech. J. 40 489Google Scholar
[24] Carter W H 1980 Appl. Opt. 19 1027Google Scholar
[25] Zhang L, Guo Y D, Chen Z Z, Gong K L, Xu J L, Yuan L, Lin Y Y, Meng S, Li Y, Shao C F, Li S, Zhang Z F, Bo Y, Peng Q J, Cui D F, Xu Z Y 2019 IEEE Photonics Technol. Lett. 31 405Google Scholar
[26] McCumber D E 1965 Bell Syst. Tech. J. 44 333Google Scholar
[27] Freiberg R J, Halsted A S 1969 Appl. Opt. 8 355Google Scholar
[28] Benesty J, Chen J, Huang Y, Cohen I 2009 Noise Reduction in Speech Processing (Berlin: Springer) pp1–4
[29] Allen L, Beijersbergen M W, Spreeuw R J C, Woerdman J P 1992 Physical Review A 45 8185
[30] 丁攀峰, 蒲继雄 2011 60 094204Google Scholar
Ding P F, Pu J X 2011 Acta Phys. Sin. 60 094204Google Scholar
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图 2 测量的高阶HG模式光斑强度分布及其沿中心轴线强度与理论强度的比较,
$ \rho $ 是各阶模式实验值与理论值的相关系数Fig. 2. Measured intensity distributions of different high order HG mode, corresponding intensity distribution curves along the central axis and the calculation curves.
$ \rho $ is the correlation coefficient between the experimental and theoretical values of each mode.表 1 各阶HG模式半径的计算理论值(
${w}_{ {n}\rm{s}}$ ), 对应的光阑实际宽度($ {D}_{x} $ ,$ {D}_{y} $ ), OC的俯仰角($ \theta $ )和功率(P)Table 1. Calculated radius (
$ {w}_{n\rm{s}} $ ) of different order HG mode, the corresponding width of the aperture ($ {D}_{x}, {D}_{y} $ ), pitch angle (θ) of OC and power (P).Mode HG00 HG01 HG02 HG03 HG04 HG05 HG06 HG07 HG08 HG09 Dx/mm 1.5 wns/mm 0.52 0.90 1.16 1.38 1.56 1.72 1.87 2.01 2.14 2.27 Dy/mm 1.5 2.0 2.4 2.7 3.2 3.5 4.0 4.2 4.5 5.0 θ/μrad 0 101.5 23.6 18.2 96.1 32.7 96.1 76.2 58.1 142.7 P/mW 213 215 223 232 239 235 241 237 242 244 -
[1] Kogelnik H, Li T 1996 Appl. Opt. 5 1550Google Scholar
[2] Sayan Ö F, Gerçekcioğlu H, Baykal Y 2020 Opt. Commun. 458 124735Google Scholar
[3] Meyrath T P, Schreck F, Hanssen J L, Chuu C S, Raizen M G 2005 Opt. Express 13 2843Google Scholar
[4] Wadhwa J, Singh A 2019 Phys. Plasmas 26 062118Google Scholar
[5] Ghotra H S, Jaroszynski D, Ersfeld B, Saini N S, Yoffe S, Kant N 2018 Laser Part. Beams 36 154Google Scholar
[6] Beijersbergen M W, Allen L, van der Veen H E L O, Woerdman J P 1993 Opt. Commun. 96 123Google Scholar
[7] Chu S C, Ohtomo T, Otsuka K 2008 Appl. Opt. 47 2583Google Scholar
[8] Ohtomo T, Chu S C, Otsuka K 2008 Opt. Express 16 5082Google Scholar
[9] Shen Y, Meng Y, Fu X, Gong M 2018 Opt. Lett. 43 291Google Scholar
[10] Coullet P, Gil L, Rocca F 1989 Opt. Commun. 73 403Google Scholar
[11] Allen L, Beijersbergen M W, Spreeuw R J C, Woerdman J P 1992 Phys. Rev. A 45 8185Google Scholar
[12] Romero J, Leach J, Jack B, Dennis M R, Franke-Arnold S, Barnett S M, Padgett M J 2011 Phys. Rev. Lett. 106 100407Google Scholar
[13] Gecevičius M, Drevinskas R, Beresna M, Kazansky P G 2014 Appl. Phys. Lett. 104 231110Google Scholar
[14] Hamazaki J, Morita R, Chujo K, Kobayashi Y, Tanda S, Omatsu T 2010 Opt. Express 18 2144Google Scholar
[15] Gu Y, Gbur G 2010 Opt. Commun. 283 1209Google Scholar
[16] Ohtomo T, Kamikariya K, Otsuka K, Chu S C 2007 Opt. Express 15 10705Google Scholar
[17] 连天虹, 王石语, 寇科, 刘芸 2020 69 114202Google Scholar
Lian T H, Wang S Y, Kou K, Liu Y 2020 Acta Phys. Sin. 69 114202Google Scholar
[18] Chu S C, Chen Y T, Tsai K F, Otsuka K 2012 Opt. Express 20 7128Google Scholar
[19] Delaubert V, Shaddock D A, Lam P K, Buchler B C, Bachor H A, McClelland D E 2002 J. Opt. A: Pure Appl. Opt. 4 393Google Scholar
[20] Ma L, Guo H, Sun H, Liu K, Su B, Gao J 2020 Photonics Res. 8 1422Google Scholar
[21] Hu A, Lei J, Chen P, Wang Y, Li S 2014 Appl. Opt. 53 7845Google Scholar
[22] Li S, Guo Y D, Chen Z Z, Zhang L, Gong K L, Zhang Z F, Xu Z Y 2019 Chin. Phys. Lett. 36 044204Google Scholar
[23] Boyd G D, Gordon J P 1961 Bell Syst. Tech. J. 40 489Google Scholar
[24] Carter W H 1980 Appl. Opt. 19 1027Google Scholar
[25] Zhang L, Guo Y D, Chen Z Z, Gong K L, Xu J L, Yuan L, Lin Y Y, Meng S, Li Y, Shao C F, Li S, Zhang Z F, Bo Y, Peng Q J, Cui D F, Xu Z Y 2019 IEEE Photonics Technol. Lett. 31 405Google Scholar
[26] McCumber D E 1965 Bell Syst. Tech. J. 44 333Google Scholar
[27] Freiberg R J, Halsted A S 1969 Appl. Opt. 8 355Google Scholar
[28] Benesty J, Chen J, Huang Y, Cohen I 2009 Noise Reduction in Speech Processing (Berlin: Springer) pp1–4
[29] Allen L, Beijersbergen M W, Spreeuw R J C, Woerdman J P 1992 Physical Review A 45 8185
[30] 丁攀峰, 蒲继雄 2011 60 094204Google Scholar
Ding P F, Pu J X 2011 Acta Phys. Sin. 60 094204Google Scholar
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