磁化套筒惯性聚变中端面损失效应的一维唯象模型与影响分析

赵海龙; 肖波; 王刚华; 王强; 阚明先; 段书超; 谢龙; 邓建军

doi:10.7498/aps.70.20201587

摘要

得益于激光预加热和轴向磁场的作用, 磁化套筒惯性聚变(magnetized liner inertial fusion, MagLIF)构型理论上能有效降低聚变实现的难度, 具有极大的应用潜力. 本文选择MagLIF过程中伴随激光预加热所必然存在端面损失效应作为研究目标, 搭建了能够描述几何参数与腊肠不稳定性等高维效应的一维唯象物理模型, 并分别通过与二维流体动力学程序和国外同类程序的计算对比完成参数拟合校验; 在此基础上, 获得端面损失效应对MagLIF内爆过程及预加热效果的影响规律. 计算结果表明: 不同喷射半径下MagLIF负载在内爆过程的绝大多数时间内保持了相近的流体动力学演化过程, 并在迟滞阶段经历了相同的质量损失比例, 且考虑端面效应后得到的预加热和内爆产额相对变差, 但却不改变规律性的趋势. 所建立的模型与结论有助于加深对MagLIF预加热和端面损失过程中物理图像的认知和理解.

关键词:

Abstract

Benefiting from laser preheat and magnetization, magnetized liner lnertial fusion (MagLIF) has a promising potential because theoretically it can dramatically lower the difficulties in realizing the controlled fusion. In this paper, the end loss effect caused by laser preheat in MagLIF process is chosen as an objective to explore its influences, and a one-dimensional and heuristic model of this effect is proposed based on the jet model of ideal fluid, in which the high-dimensional influences, such as geometric parameters and sausage instability, are taken into consideration. To complete the verification progress, the calculation results of one-dimensional MIST code and two-dimensional programs TriAngels and HDYRA are compared, and the application scopes of this heuristic model are discussed and summarized. Based on this model, the key parameters and influences of the end loss effect on the MagLIF implosion process and pre-heating effect are obtained. The calculation results show that the MagLIF load maintains a similar hydrodynamic evolution process in most of the implosion processes with different laser entrance radii, and experiences the same percentage of mass (～16%) lost during stagnation stage. With the same driving current, the fuel temperature will rise higher in the model with more mass losing, so the fusion yields do not change too much. The mass loss ratio seems to play a dominant role. It is recommended to design the laser entrance hole as small as possible in the experiment to increase the yield. The predictions obtained after considering the end loss effect lower the preheating temperature and fusion yield, but no change happens to the regularity trend. As the liner height increases, the preheating temperature, peak current, fuel internal energy, and fusion yield each still show a monotonically downward trend. Therefore, under the premise of fixed driving capability and laser output capability, it is suggested that the liner height in MagLIF load design should be as short as possible. The established heuristic model and conclusions are helpful in better understanding the physical mechanism in the process of MagLIF preheat and end loss.

Keywords:

作者及机构信息

中国工程物理研究院流体物理研究所, 绵阳　621900

通信作者: 赵海龙, ifp.zhaohailong@qq.com

基金项目: 国家自然科学基金(批准号: 11205145, 12075226)资助的课题

Authors and contacts

Institute of Fluid Physics, China Academy of Engineering Physics, Mianyang 621900, China

Corresponding author: Zhao Hai-Long, ifp.zhaohailong@qq.com

Funds: Project supported by the National Natural Science Foundation of China (Grant Nos. 11205145, 12075226)

文章全文 : translate this paragraph

参考文献

[1]	Ding B J, Bonoli P T, Tuccillo A, Goniche M, Kirov K, Li M, Li Y, Cesario R, Peysson Y, Ekedahl A, Amicucci L, Baek S, Faust I, Parker R, Shiraiwa S, Wallace G M, Cardinali A, Castaldo C, Ceccuzzi S, Mailloux J, Napoli F, Liu F, Wan B 2018 Nucl. Fusion 58 095003 Google Scholar
[2]	Makwana K D, Keppens R, Lapenta G 2018 Phys. Plasmas 25 082904 Google Scholar
[3]	Shimomura Y, Spears W 2004 IEEE Trans. Plasma Sci. 14 1369 Google Scholar
[4]	Clark D S, Weber C R, Milovich J L, Pak A E, Casey D T, Hammel B A, Ho D D, Jones O S, Koning J M, Kritcher A L, Marinak M M, Masse L P, Munro D H, Patel M V, Patel P K, Robey H F, Schroeder C R, Sepke S M, Edwards M J 2019 Phys. Plasmas 26 050601 Google Scholar
[5]	Perkins L J, Logan B G, Zimmerman G B, Werner C J 2013 Phys. Plasmas 20 072708 Google Scholar
[6]	McCrory R L, Meyerhofer D D, Betti R, Craxton R S, Delettrez J A, Edgell D H, Glebov V Yu, Goncharov V N, Harding D R, Jacobs-Perkins D W, Knauer J P, Marshall F J, McKenty P W, Radha P B, Regan S P 2008 Phys. Plasmas 15 055503 Google Scholar
[7]	Chen Y Y, Bao X H, Fu P, Gao G 2019 Chin. Phys. B 28 015201 Google Scholar
[8]	Zhang Y K, Zhou R J, Hu L Q, Chen M W, Chao Y 2018 Chin. Phys. B 27 055206 Google Scholar
[9]	Tikhonchuk V, Gu Y J, Klimo O, Limpouch J, Weber S 2019 Matter Radiat. Extremes 4 045402 Google Scholar
[10]	薛全喜, 江少恩, 王哲斌, 王峰, 赵学庆, 易爱平, 丁永坤, 刘晶儒 2018 物理学报 24 094701 Google Scholar Xue Q X, Jiang S E, Wang Z B, Wang F, Zhao X Q, Yi A P, Ding Y K, Liu J R 2018 Acta Phys. Sin. 24 094701 Google Scholar
[11]	Wu F Y, Chu Y Y, Ramis R, Li Z H, Ma Y Y, Yang J L, Wang Z, Ye F, Huang Z C, Qi J M, Zhou L, Liang C, Chen S J, Ge Z Y, Yang X H, Wang S W 2018 Matter Radiat. Extremes 3 248 Google Scholar
[12]	Ding N, Zhang Y, Xiao D L, Wu J M, Dai Z H, Yin L, Gao Z M, Sun S K, Xue C, Ning C, Shu X J, Wang J G 2016 Matter Radiat. Extremes 1 135 Google Scholar
[13]	Slutz S A, Herrmann M C, Vesey R A, Sefkow A B, Sinars D B, Rovang D C, Peterson K J, Cuneo M E 2010 Phys. Plasmas 17 056303 Google Scholar
[14]	Paradela J, García-Rubio F, Sanz J 2019 Phys. Plasmas 26 012705 Google Scholar
[15]	Slutz S A, Vesey R A 2012 Phys. Rev. Lett 108 025003 Google Scholar
[16]	Sefkow A B, Slutz S A, Koning J M, Marinak M M, Peterson K J, Sinars D B, Vesey R A 2014 Phys. Plasmas 21 072711 Google Scholar
[17]	Slutz S A 2018 Phys. Plasmas 25 082707 Google Scholar
[18]	Gomez M R, Slutz S A, Sefkow A B, Sinars D B, Hahn K, D, Hansen S B, Harding E C, Knapp P F, Schmit P F, Jennings C A, Awe T J, Geissel M, Rovang D C, Chandler G A, Cooper G W, Cuneo M E, Harvey-Thompson A J, Herrmann M C, Hess M H, Johns O, Lamppa D C, Martin M R, McBride R D, Peterson K J, Porter J L, Robertson G K, Rochau G A, Ruiz C L, Savage M E, Smith I C, Stygar W A, Vesey R A 2014 Phys. Rev. Lett 113 155003 Google Scholar
[19]	Awe T J, McBride R D, Jennings C A, Lamppa D C, Martin M R, Rovang D C, Slutz S A, Cuneo M E, Owen A C, Sinars D B, Tomlinson K, Gomez M R, Hansen S B, Herrmann M C, McKenney J L, Nakhleh C, Robertson G K, Rochau G A, Savage M E, Schroen D G, Stygar W A 2013 Phys. Rev. Lett 111 235005 Google Scholar
[20]	Seyler C E, Martin M R, Hamlin N D 2018 Phys. Plasmas 25 062711 Google Scholar
[21]	Geissel M, Harvey-Thompson A J, Awe T J, Bliss D E, Glinsky M E, Gomez M R, Harding E, Hansen S B, Jennings C, Kimmel M W, Knapp P, Lewis S M, Peterson K, Schollmeier M, Schwarz J, Shores J E, Slutz S A, Sinars D B, Smith I C, Speas C S, Vesey R A, Weis M R, Porter J L 2018 Phys. Plasmas 25 022706 Google Scholar
[22]	Davies J R, Bahr R E, Barnak D H, Betti R, Bonino M J, Campbell E M, Hansen E C, Harding D R, Peebles J L, Sefkow A B, Seka W, Chang P Y, Geissel M, Harvey-Thompson A J 2018 Phys. Plasmas 25 062704 Google Scholar
[23]	Slutz S A 2015 Sandia National Laboratory Report SAND2015-1515R
[24]	赵海龙, 肖波, 王刚华, 王强, 章征伟, 孙奇志, 邓建军 2020 物理学报 69 035203 Google Scholar Zhao H L, Xiao B, Wang G H, Wang Q, Zhang Z W, Sun Q Z, Deng J J 2020 Acta Phys. Sin. 69 035203 Google Scholar
[25]	赵海波, 肖波, 柏劲松, 段书超, 王刚华, 阚明先, 陈芳 2018 高压物理学报 32 042303 Google Scholar Zhao H B, Xiao B, Bai J S, Duan S C, Wang G H, Kan M X, Chen F 2018 Chin. J. High Pressure Phys. 32 042303 Google Scholar
[26]	赵海波 2018 硕士学位论文 (北京: 中国工程物理研究院研究生部) Zhao H B 2018 M. S. Thesis (Beijing: China Academy of Engineering Physics) (in Chinese)
[27]	Jennings C A, Chittenden J P, Cuneo M E, Stygar W A, Ampleford D J, Waisman E M, Jones M, Savage M E, LeChien K R, Wagoner T C 2010 IEEE Trans. Plasma Sci. 38 529 Google Scholar
[28]	McBride R D, Jennings C A, Vesey R A, Rochau G A, Savage M E, Stygar W A, Cuneo M E, Sinars D B, Jones M, LeChien K R, Lopez M R, Moore J K, Struve K W, Wagoner T C, Waisman E M 2010 Phys. Rev. ST Accel. Beams 13 120401 Google Scholar

施引文献

图 1 MagLIF过程示意图(包含3个主要阶段)

Fig. 1. Schematic of MagLIF process, including three main stages.

下载: 全尺寸图片幻灯片

图 2 端面效应简化模型示意图

Fig. 2. Schematic of simplified model describing end loss effect.

下载: 全尺寸图片幻灯片

图 3 由轴向压力不平衡引发的腊肠不稳定性种子示意图

Fig. 3. Schematic of instability seed caused by axial pressure imbalance.

下载: 全尺寸图片幻灯片

图 4 标准流体动力学模型　(a) 初始负载参数; (b) 36 ns时密度分布示意图

Fig. 4. (a) Initial parameters and (b) density distribution at 36 ns calculated by TriAngels.

下载: 全尺寸图片幻灯片

图 5 MIST与TriAngels计算得到的套筒内剩余燃料质量随时间演化关系

Fig. 5. Comparison between remained fuel mass calculated by MIST and TriAngels.

下载: 全尺寸图片幻灯片

图 6 不同初始条件影响下MIST与TriAngels计算得到的套筒内剩余燃料质量随时间演化关系(A = 0.31)　(a) h = 0.75 cm; (b) g = 2 mg/cm³; (c) r_LEH = 0.15 cm

Fig. 6. Comparison between remained fuel mass calculated by MIST and TriAngels under different initial parameters (A = 0.31): (a) h = 0.75 cm; (b) g = 2 mg/cm³; (c) r_LEH = 0.15 cm.

下载: 全尺寸图片幻灯片

图 7 MIST计算所使用的(a)驱动电流曲线, 以及(b)剩余燃料质量随时间演化曲线

Fig. 7. Demonstrations of (a) driving current and (b) remained fuel mass calculated by MIST.

下载: 全尺寸图片幻灯片

图 8 MIST计算得到的剩余燃料质量随时间演化曲线(B = 0.42, ρ = 2.0 mg/cm³)

Fig. 8. Remained fuel mass evolving with time calculated by MIST (B = 0.42, ρ = 2.0 mg/cm³).

下载: 全尺寸图片幻灯片

图 9 不同LEH半径下MIST计算得到的(a)聚变产额和(b) 余燃料比例随时间演化曲线

Fig. 9. (a) Fusion yield and (b) remained fuel mass calculated by MIST under different LEH radii.

下载: 全尺寸图片幻灯片

图 10 不同LEH半径下, MIST计算得到的139 ns时的　(a)密度分布和(b)温度分布

Fig. 10. Distributions of (a) density and (b) temperature calculated by MIST under different LEH radii at 139 ns.

下载: 全尺寸图片幻灯片

图 11 不同LEH半径下MIST计算得到的(a)交界面演化曲线和(b)迟滞时刻温度分布图

Fig. 11. (a) Liner-fuel interface evolving with time and (b) temperature distribution at stagnation time calculated by MIST under different LEH radii.

下载: 全尺寸图片幻灯片

图 12 简化后的ZR装置等效电路示意图^[28]

Fig. 12. Schematic of simplified equivalent circuit of ZR facility^[28].

下载: 全尺寸图片幻灯片

图 13 MIST计算使用的(a)绝缘堆电压曲线和(b)负载电流曲线

Fig. 13. (a) Voltage curve from the vacuum insulator and (b) load current curve calculated by MIST code.

下载: 全尺寸图片幻灯片

表 1 不同套筒高度计算得到的内爆结果对比(不考虑端面损失效应)

Table 1. Calculated implosion results at different liner heights by MIST (without end loss effect)

套筒高度h/cm	预加热温度/eV	峰值电流/MA	燃料峰值内能/(kJ·cm^–1)	聚变产额/(kJ·cm^–1)	能量增益Q
0.50	890	29.5	786	2426	3.1
0.75	615	28.9	668	2133	3.2
1.00	450	28.2	565	1614	2.9
1.25	364	27.4	478	1172	2.5

下载: 导出CSV

表 2 不同套筒高度计算得到的内爆结果对比(考虑端面损失效应)

Table 2. Calculated implosion results at different liner heights by MIST (with end loss effect).

套筒高度h/cm	预加热温度/eV	峰值电流/MA	燃料峰值内能/(kJ·cm^–1)	聚变产额/(kJ·cm^–1)	能量增益Q
0.50	890	29.5	486	1850	3.8
0.75	615	28.9	480	1660	3.45
1.00	450	28.2	440	1320	3.0
1.25	364	27.4	400	990	2.48

下载: 导出CSV

[1]	Ding B J, Bonoli P T, Tuccillo A, Goniche M, Kirov K, Li M, Li Y, Cesario R, Peysson Y, Ekedahl A, Amicucci L, Baek S, Faust I, Parker R, Shiraiwa S, Wallace G M, Cardinali A, Castaldo C, Ceccuzzi S, Mailloux J, Napoli F, Liu F, Wan B 2018 Nucl. Fusion 58 095003 Google Scholar
[2]	Makwana K D, Keppens R, Lapenta G 2018 Phys. Plasmas 25 082904 Google Scholar
[3]	Shimomura Y, Spears W 2004 IEEE Trans. Plasma Sci. 14 1369 Google Scholar
[4]	Clark D S, Weber C R, Milovich J L, Pak A E, Casey D T, Hammel B A, Ho D D, Jones O S, Koning J M, Kritcher A L, Marinak M M, Masse L P, Munro D H, Patel M V, Patel P K, Robey H F, Schroeder C R, Sepke S M, Edwards M J 2019 Phys. Plasmas 26 050601 Google Scholar
[5]	Perkins L J, Logan B G, Zimmerman G B, Werner C J 2013 Phys. Plasmas 20 072708 Google Scholar
[6]	McCrory R L, Meyerhofer D D, Betti R, Craxton R S, Delettrez J A, Edgell D H, Glebov V Yu, Goncharov V N, Harding D R, Jacobs-Perkins D W, Knauer J P, Marshall F J, McKenty P W, Radha P B, Regan S P 2008 Phys. Plasmas 15 055503 Google Scholar
[7]	Chen Y Y, Bao X H, Fu P, Gao G 2019 Chin. Phys. B 28 015201 Google Scholar
[8]	Zhang Y K, Zhou R J, Hu L Q, Chen M W, Chao Y 2018 Chin. Phys. B 27 055206 Google Scholar
[9]	Tikhonchuk V, Gu Y J, Klimo O, Limpouch J, Weber S 2019 Matter Radiat. Extremes 4 045402 Google Scholar
[10]	薛全喜, 江少恩, 王哲斌, 王峰, 赵学庆, 易爱平, 丁永坤, 刘晶儒 2018 物理学报 24 094701 Google Scholar Xue Q X, Jiang S E, Wang Z B, Wang F, Zhao X Q, Yi A P, Ding Y K, Liu J R 2018 Acta Phys. Sin. 24 094701 Google Scholar
[11]	Wu F Y, Chu Y Y, Ramis R, Li Z H, Ma Y Y, Yang J L, Wang Z, Ye F, Huang Z C, Qi J M, Zhou L, Liang C, Chen S J, Ge Z Y, Yang X H, Wang S W 2018 Matter Radiat. Extremes 3 248 Google Scholar
[12]	Ding N, Zhang Y, Xiao D L, Wu J M, Dai Z H, Yin L, Gao Z M, Sun S K, Xue C, Ning C, Shu X J, Wang J G 2016 Matter Radiat. Extremes 1 135 Google Scholar
[13]	Slutz S A, Herrmann M C, Vesey R A, Sefkow A B, Sinars D B, Rovang D C, Peterson K J, Cuneo M E 2010 Phys. Plasmas 17 056303 Google Scholar
[14]	Paradela J, García-Rubio F, Sanz J 2019 Phys. Plasmas 26 012705 Google Scholar
[15]	Slutz S A, Vesey R A 2012 Phys. Rev. Lett 108 025003 Google Scholar
[16]	Sefkow A B, Slutz S A, Koning J M, Marinak M M, Peterson K J, Sinars D B, Vesey R A 2014 Phys. Plasmas 21 072711 Google Scholar
[17]	Slutz S A 2018 Phys. Plasmas 25 082707 Google Scholar
[18]	Gomez M R, Slutz S A, Sefkow A B, Sinars D B, Hahn K, D, Hansen S B, Harding E C, Knapp P F, Schmit P F, Jennings C A, Awe T J, Geissel M, Rovang D C, Chandler G A, Cooper G W, Cuneo M E, Harvey-Thompson A J, Herrmann M C, Hess M H, Johns O, Lamppa D C, Martin M R, McBride R D, Peterson K J, Porter J L, Robertson G K, Rochau G A, Ruiz C L, Savage M E, Smith I C, Stygar W A, Vesey R A 2014 Phys. Rev. Lett 113 155003 Google Scholar
[19]	Awe T J, McBride R D, Jennings C A, Lamppa D C, Martin M R, Rovang D C, Slutz S A, Cuneo M E, Owen A C, Sinars D B, Tomlinson K, Gomez M R, Hansen S B, Herrmann M C, McKenney J L, Nakhleh C, Robertson G K, Rochau G A, Savage M E, Schroen D G, Stygar W A 2013 Phys. Rev. Lett 111 235005 Google Scholar
[20]	Seyler C E, Martin M R, Hamlin N D 2018 Phys. Plasmas 25 062711 Google Scholar
[21]	Geissel M, Harvey-Thompson A J, Awe T J, Bliss D E, Glinsky M E, Gomez M R, Harding E, Hansen S B, Jennings C, Kimmel M W, Knapp P, Lewis S M, Peterson K, Schollmeier M, Schwarz J, Shores J E, Slutz S A, Sinars D B, Smith I C, Speas C S, Vesey R A, Weis M R, Porter J L 2018 Phys. Plasmas 25 022706 Google Scholar
[22]	Davies J R, Bahr R E, Barnak D H, Betti R, Bonino M J, Campbell E M, Hansen E C, Harding D R, Peebles J L, Sefkow A B, Seka W, Chang P Y, Geissel M, Harvey-Thompson A J 2018 Phys. Plasmas 25 062704 Google Scholar
[23]	Slutz S A 2015 Sandia National Laboratory Report SAND2015-1515R
[24]	赵海龙, 肖波, 王刚华, 王强, 章征伟, 孙奇志, 邓建军 2020 物理学报 69 035203 Google Scholar Zhao H L, Xiao B, Wang G H, Wang Q, Zhang Z W, Sun Q Z, Deng J J 2020 Acta Phys. Sin. 69 035203 Google Scholar
[25]	赵海波, 肖波, 柏劲松, 段书超, 王刚华, 阚明先, 陈芳 2018 高压物理学报 32 042303 Google Scholar Zhao H B, Xiao B, Bai J S, Duan S C, Wang G H, Kan M X, Chen F 2018 Chin. J. High Pressure Phys. 32 042303 Google Scholar
[26]	赵海波 2018 硕士学位论文 (北京: 中国工程物理研究院研究生部) Zhao H B 2018 M. S. Thesis (Beijing: China Academy of Engineering Physics) (in Chinese)
[27]	Jennings C A, Chittenden J P, Cuneo M E, Stygar W A, Ampleford D J, Waisman E M, Jones M, Savage M E, LeChien K R, Wagoner T C 2010 IEEE Trans. Plasma Sci. 38 529 Google Scholar
[28]	McBride R D, Jennings C A, Vesey R A, Rochau G A, Savage M E, Stygar W A, Cuneo M E, Sinars D B, Jones M, LeChien K R, Lopez M R, Moore J K, Struve K W, Wagoner T C, Waisman E M 2010 Phys. Rev. ST Accel. Beams 13 120401 Google Scholar

[1]	严玉为, 蒋沅, 杨松青, 余荣斌, 洪成. 基于时间序列的网络失效模型. 物理学报, 2022, 71(8): 088901. doi: 10.7498/aps.71.20212106
[2]	郝保龙, 陈伟, 李国强, 王晓静, 王兆亮, 吴斌, 臧庆, 揭银先, 林晓东, 高翔, CFETRTEAM. 中国聚变工程试验堆上新经典撕裂模和纵场波纹扰动叠加效应对alpha粒子损失影响的数值模拟. 物理学报, 2021, 70(11): 115201. doi: 10.7498/aps.70.20201972
[3]	赵海龙, 王刚华, 肖波, 王强, 阚明先, 段书超, 谢龙. 磁化套筒惯性聚变中轴向磁场演化特征与Nernst效应影响. 物理学报, 2021, 70(13): 135201. doi: 10.7498/aps.70.20202215
[4]	鲁圣国, 李丹丹, 林雄威, 简晓东, 赵小波, 姚英邦, 陶涛, 梁波. 铁电材料中电场对唯象系数和电卡强度的影响. 物理学报, 2020, 69(12): 127701. doi: 10.7498/aps.69.20200296
[5]	赵海龙, 肖波, 王刚华, 王强, 章征伟, 孙奇志, 邓建军. 磁化套筒惯性聚变一维集成化数值模拟. 物理学报, 2020, 69(3): 035203. doi: 10.7498/aps.69.20191411
[6]	杨钧兰, 钟哲强, 翁小凤, 张彬. 惯性约束聚变装置中靶面光场特性的统计表征方法. 物理学报, 2019, 68(8): 084207. doi: 10.7498/aps.68.20182091
[7]	赵光银, 李应红, 梁华, 化为卓, 韩孟虎. 纳秒脉冲表面介质阻挡等离子体激励唯象学仿真. 物理学报, 2015, 64(1): 015101. doi: 10.7498/aps.64.015101
[8]	罗旭东, 牛胜利, 左应红. 典型甚低频电磁波对辐射带高能电子的散射损失效应. 物理学报, 2015, 64(6): 069401. doi: 10.7498/aps.64.069401
[9]	李永东, 杨文晋, 张娜, 崔万照, 刘纯亮. 一种二次电子发射的复合唯象模型. 物理学报, 2013, 62(7): 077901. doi: 10.7498/aps.62.077901
[10]	张占文, 漆小波, 李波. 惯性约束聚变点火靶候选靶丸特点及制备研究进展. 物理学报, 2012, 61(14): 145204. doi: 10.7498/aps.61.145204
[11]	尚玉黎, 舒明飞, 陈威, 曹万强. 钛酸钡基施主掺杂弛豫铁电体介电弥散的唯象分析. 物理学报, 2012, 61(19): 197701. doi: 10.7498/aps.61.197701
[12]	余波, 应阳君, 许海波. 惯性约束聚变的中子半影成像诊断系统的优化研究. 物理学报, 2010, 59(6): 4100-4109. doi: 10.7498/aps.59.4100
[13]	张磊, 胡九宁, 任敏, 董浩, 邓宁, 陈培毅. 电流感应磁化翻转效应的改进的系综模型. 物理学报, 2009, 58(1): 488-493. doi: 10.7498/aps.58.488
[14]	鲁公儒, 程晓东. 中性D介子混合和强作用相角差的唯象研究. 物理学报, 2009, 58(5): 3034-3040. doi: 10.7498/aps.58.3034
[15]	艾树涛, 王春雷, 钟维烈, 张沛霖. 关于铁电相变的一个唯象讨论. 物理学报, 2001, 50(5): 910-913. doi: 10.7498/aps.50.910
[16]	徐晓虎, 沈剑. 铁电超晶格的一个唯象模型. 物理学报, 1999, 48(11): 2142-2145. doi: 10.7498/aps.48.2142
[17]	李富斌. 非平衡涨落问题的微观唯象分析理论(Ⅱ)——物理系统中的非平衡涨落与由信息理论所求得的热传导精确结果的比较. 物理学报, 1989, 38(10): 1642-1647. doi: 10.7498/aps.38.1642
[18]	吴自玉, 汪克林, 兰慧彬, 章正刚, 冼鼎昌. 赝标介子的唯象模型(Ⅱ)——电磁形状因子. 物理学报, 1987, 36(12): 1618-1623. doi: 10.7498/aps.36.1618
[19]	吴自玉；兰慧彬；汪克林；刘耀阳；章正刚；冼鼎昌. 赝标介子的唯象模型（I). 物理学报, 1987, 36(8): 1048-1055. doi: 10.7498/aps.36.1048
[20]	宋行长. 轻子与非轻子弱相互作用的唯象描述. 物理学报, 1965, 21(1): 218-220. doi: 10.7498/aps.21.218

计量

文章访问数: 4045
PDF下载量: 43
被引次数: 0

姓名
邮箱
手机号码
标题
留言内容
验证码

搜索

留言板