[1] |
闵光云, 刘小会, 严波, 等. 覆冰四分裂导线的气动特性与舞动特性 [J]. 科学技术与工程, 2020, 20(21): 8607-8615. DOI: 10.3969/j.issn.1671-1815.2020.21.027.
MIN G Y, LIU X H, YAN B, et al. Aerodynamic characteristics and galloping characteristics of iced quad bundle conductor [J]. Science technology and engineering, 2020, 20(21): 8607-8615. DOI: 10.3969/j.issn.1671-1815.2020.21.027. |
[2] |
LILIEN J L, HAVARD D G. Galloping database on single and bundle conductors prediction of maximum amplitudes [J]. IEEE transactions on power delivery, 2000, 15(2): 670-674. DOI: 10.1109/61.853003. |
[3] |
GURUNG C B, YAMAGUCHI H, YUKINO T. Identification and characterization of galloping of Tsuruga test line based on multi-channel modal analysis of field data [J]. Journal of wind engineering and industrial aerodynamics, 2003, 91(7): 903-924. DOI: 10.1016/S0167-6105(03)00018-7. |
[4] |
IRVINE H M. Cable structures [M]. Cambridge: The MIT Press, 1981. |
[5] |
赵跃宇, 周海兵, 金波, 等. 考虑弯曲刚度的斜拉索内共振分析 [J]. 湖南大学学报(自然科学版), 2007, 34(5): 1-5. DOI: 10.3321/j.issn:1000-2472.2007.05.001.
ZHAO Y Y, ZHOU H B, JIN B, et al. Internal response of inclined cable considering bending rigidity [J]. Journal of Hunan university:natural sciences, 2007, 34(5): 1-5. DOI: 10.3321/j.issn:1000-2472.2007.05.001. |
[6] |
赵跃宇, 周海兵, 金波, 等. 弯曲刚度对斜拉索非线性固有频率的影响 [J]. 工程力学, 2008, 25(1): 196-202.
ZHAO Y Y, ZHOU H B, JIN B, et al. Influence of bending rigidity on nonlinear natural frequency of inclined cable [J]. Engineering mechanics, 2008, 25(1): 196-202. |
[7] |
肖一, 卓卫东, 范立础. 考虑弯曲刚度的悬索自由振动解析解 [J]. 水利与建筑工程学报, 2013, 11(1): 117-121. DOI: 10.3969/j.issn.1672-1144.2013.01.027.
XIAO Y, ZHUO W D, FAN L C. Analytical solution for free vibration of suspension cables considering bending stiffness [J]. Journal of water resources and architectural engineering, 2013, 11(1): 117-121. DOI: 10.3969/j.issn.1672-1144.2013.01.027. |
[8] |
肖一, 卓卫东, 范立础. 考虑弯曲刚度的悬索面内自由振动解析解 [J]. 地震工程与工程振动, 2013, 33(4): 75-80. DOI: 10.11810/1000-1301.20130409.
XIAO Y, ZHUO W D, FAN L C. Analytical solution of in-plane free vibration of suspension cables considering bending stiffness [J]. Earthquake engineering and engineering vibration, 2013, 33(4): 75-80. DOI: 10.11810/1000-1301.20130409. |
[9] |
WU Q, TAKAHASHI K, NAKAMURA S. Formulae for frequencies and modes of in-plane vibrations of small-sag inclined cables [J]. Journal of sound and vibration, 2005, 279(3/5): 1155-1169. DOI: 10.1016/j.jsv.2004.01.004. |
[10] |
YAN Z M, YAN Z T, LI Z L, et al. Nonlinear galloping of internally resonant iced transmission lines considering eccentricity [J]. Journal of sound and vibration, 2012, 331(15): 3599-3616. DOI: 10.1016/j.jsv.2012.03.011. |
[11] |
YAN Z T, LI Z L, SAVORY E, et al. Galloping of a single iced conductor based on curved-beam theory [J]. Journal of wind engineering and industrial aerodynamics, 2013, 123: 77-87. DOI: 10.1016/j.jweia.2013.10.002. |
[12] |
YAN Z T, SAVORY E, LI Z L, et al. Galloping of iced quad-conductors bundles based on curved beam theory [J]. Journal of sound and vibration, 2014, 333(6): 1657-1670. DOI: 10.1016/j.jsv.2013.11.023. |
[13] |
吕建根, 康厚军. 考虑弯曲刚度斜拉索面内面外内共振分析 [J]. 力学季刊, 2016, 37(3): 572-580. DOI: 10.15959/j.cnki.0254-0053.2016.03.018.
LÜ J G, KANG H J. In-plane and out-of-plane internal resonance of stay cables considering bending stiffness [J]. Chinese quarterly of mechanics, 2016, 37(3): 572-580. DOI: 10.15959/j.cnki.0254-0053.2016.03.018. |
[14] |
吕建根, 王荣辉. 索梁结构中抗弯刚度斜拉索的非线性响应 [J]. 动力学与控制学报, 2019, 17(4): 326-334. DOI: 10.6052/1672-6553-2019-028.
LÜ J G, WANG R H. Nonlinear response of stay cables with flexural rigidity in cable-stayed beams [J]. Journal of dynamics and control, 2019, 17(4): 326-334. DOI: 10.6052/1672-6553-2019-028. |
[15] |
刘小会, 闵光云, 孙测世, 等. 直接法与间接法对拉索耦合内共振的影响研究 [J]. 应用力学学报, 2020, 37(3): 1088-1098. DOI: 10.11776/cjam.37.03.C099.
LIU X H, MIN G Y, SUN C S, et al. Influence of direct method and indirect method on internal resonance of cable [J]. Chinese journal of applied mechanics, 2020, 37(3): 1088-1098. DOI: 10.11776/cjam.37.03.C099. |
[16] |
LIU X H, MIN G Y, CAI M Q, et al. Two simplified methods for galloping of iced transmission lines [J]. KSCE journal of civil engineering, 2021, 25(1): 272-290. DOI: 10.1007/s12205-020-0693-y. |
[17] |
闵光云, 刘小会, 孙测世, 等. 动张力简化方法对输电线舞动的影响研究 [J]. 应用力学学报, 2020, 37(4): 1717-1723. DOI: 10.11776/cjam.37.04.C071.
MIN G Y, LIU X H, SUN C S, et al. Study on the influence of simplification method of dynamic tension on the galloping of transmission line [J]. Chinese journal of applied mechanics, 2020, 37(4): 1717-1723. DOI: 10.11776/cjam.37.04.C071. |
[18] |
YOUNESPOUR A, CHENG S H. In-plane modal responses of two-cable networks considering cable bending stiffness effect [J]. Engineering structures, 2021, 230: 111691. DOI: 10.1016/j.engstruct.2020.111691. |
[19] |
楼文娟, 林巍, 黄铭枫, 等. 不同厚度新月形覆冰对导线气动力特性的影响 [J]. 空气动力学学报, 2013, 31(5): 616-622.
LOU W J, LIN W, HUANG M F, et al. The impact of ice thickness on the aerodynamic characteristics of crescent shape iced conductors [J]. Acta aerodynamica sinica, 2013, 31(5): 616-622. |
[20] |
王少华. 覆冰荷载下的架空输电线气动稳定性分析 [J]. 电力科学与技术学报, 2010, 25(3): 72-76. DOI: 10.3969/j.issn.1673-9140.2010.03.011.
WANG S H. Aerodynamic stability analysis of ice-covered overhead transmission lines [J]. Journal of electric power science and technology, 2010, 25(3): 72-76. DOI: 10.3969/j.issn.1673-9140.2010.03.011. |
[21] |
谢增, 刘吉轩, 刘超群, 等. 覆冰输电线路分裂导线舞动的建模与数值模拟 [J]. 西安交通大学学报, 2012, 46(7): 69-74.
XIE Z, LIU J X, LIU C Q, et al. Modelling and simulation for iced bundle conductor galloping [J]. Journal of Xi'an Jiaotong university, 2012, 46(7): 69-74. |
[22] |
苏攀, 孔韬, 董晓虎. 架空输电线舞动的临界风速研究 [J]. 三峡大学学报(自然科学版), 2015, 37(6): 70-74. DOI: 10.13393/j.cnki.issn.1672-948X.2015.06.015.
SU P, KONG T, DONG X H. Critical wind speed of overhead transmission line galloping [J]. Journal of China three gorges university:natural science), 2015, 37(6): 70-74. DOI: 10.13393/j.cnki.issn.1672-948X.2015.06.015. |
[23] |
李万平, 黄河, 何锃. 特大覆冰导线气动力特性测试 [J]. 华中科技大学学报, 2001, 29(8): 84-86. DOI: 10.3321/j.issn:1671-4512.2001.08.029.
LI W P, HUANG H, HE Z. Aerodynamic characteristics of heavily iced conductors [J]. Journal of Huazhong university of science and technology, 2001, 29(8): 84-86. DOI: 10.3321/j.issn:1671-4512.2001.08.029. |
[24] |
李万平, 杨新祥, 张立志. 覆冰导线群的静气动力特性 [J]. 空气动力学学报, 1995, 13(4): 427-434.
LI W P, YANG X X, ZHANG L Z. Static aerodynamic characteristics of the galloping of bundled iced power transmission lines [J]. Acta aerodynamica sinica, 1995, 13(4): 427-434. |
[25] |
李万平. 覆冰导线群的动态气动力特性 [J]. 空气动力学学报, 2000, 18(4): 413-420. DOI: 10.3969/j.issn.0258-1825.2000.04.006.
LI W P. Dynamic aerodynamic characteristics of the galloping of bundled iced power transmission lines [J]. Acta aerodynamica sinica, 2000, 18(4): 413-420. DOI: 10.3969/j.issn.0258-1825.2000.04.006. |
[26] |
张宏雁, 严波, 周松, 等. 覆冰四分裂导线静态气动力特性试验 [J]. 空气动力学学报, 2011, 29(2): 150-154. DOI: 10.3969/j.issn.0258-1825.2011.02.004.
ZHANG H Y, YAN B, ZHOU S, et al. Static test on aerodynamic characteristics of iced quad bundled conductors [J]. Acta aerodynamica sinica, 2011, 29(2): 150-154. DOI: 10.3969/j.issn.0258-1825.2011.02.004. |
[27] |
张宏雁, 严波, 刘小会, 等. 覆冰导线气动特性及驰振风洞试验 [J]. 振动与冲击, 2013, 32(10): 95-99. DOI: 10.3969/j.issn.1000-3835.2013.10.018.
ZHANG H Y, YAN B, LIU X H, et al. Wind-tunnel tests for aerodynamic characteristics and galloping behaviors of iced conductors [J]. Journal of vibration and shock, 2013, 32(10): 95-99. DOI: 10.3969/j.issn.1000-3835.2013.10.018. |
[28] |
严波, 刘小会, 胡景, 等. 覆冰四分裂导线节段模型驰振风洞模拟试验 [J]. 空气动力学学报, 2014, 32(1): 109-115. DOI: 10.7638/kqdlxxb-2012.0064.
YAN B, LIU X H, HU J, et al. Wind-tunnel test for galloping of iced quad bundle conductors [J]. Acta aerodynamica sinica, 2014, 32(1): 109-115. DOI: 10.7638/kqdlxxb-2012.0064. |
[29] |
楼文娟, 余江, 姜雄, 等. 覆冰六分裂导线舞动风洞试验及起舞风速研究 [J]. 振动工程学报, 2017, 30(2): 280-289. DOI: 10.16385/j.cnki.issn.1004-4523.2017.02.014.
LOU W J, YU J, JIANG X, et al. Wind tunnel test and critical wind speed study for galloping of 6-bundled iced conductors [J]. Journal of vibration engineering, 2017, 30(2): 280-289. DOI: 10.16385/j.cnki.issn.1004-4523.2017.02.014. |
[30] |
CAI M Q, ZHOU L S, LEI H, et al. Wind tunnel test investigation on unsteady aerodynamic coefficients of iced 4-bundle conductors [J]. Advances in civil engineering, 2019, 2019: 2586242. DOI: 10.1155/2019/2586242. |
[31] |
彭家宁, 张栋梁, 赵高煜, 等. 覆冰导线气动力特性的规律性研究 [J]. 固体力学学报, 2014, 35(增刊1): 202-207. DOI: 10.19636/j.cnki.cjsm42-1250/o3.2014.s1.034.
PENG J N, ZHANG D L, ZHAO G Y, et al. Research on regularity of the aerodynamic characteristics of iced conductor [J]. Chinese journal of solid mechanics, 2014, 35(Suppl. 1): 202-207. DOI: 10.19636/j.cnki.cjsm42-1250/o3.2014.s1.034. |
[32] |
王琼, 王黎明, 卢明, 等. 覆冰四分裂导线风洞试验与舞动研究 [J]. 高电压技术, 2019, 45(5): 1608-1615. DOI: 10.13336/j.1003-6520.hve.20181207001.
WANG Q, WANG L M, LU M, et al. Study on wind tunnel test and galloping of iced quad bundle conductor [J]. High voltage engineering, 2019, 45(5): 1608-1615. DOI: 10.13336/j.1003-6520.hve.20181207001. |
[33] |
吕翼, 楼文娟, 孙珍茂, 等. 覆冰三分裂导线气动力特性的数值模拟 [J]. 浙江大学学报(工学版), 2010, 44(1): 174-179. DOI: 10.3785/j.issn.1008-973X.2010.01.031.
LÜ Y, LOU W J, SUN Z M, et al. Numerical simulation of aerodynamic characteristics of three bundled iced transmission lines [J]. Journal of Zhejiang university:engineering science, 2010, 44(1): 174-179. DOI: 10.3785/j.issn.1008-973X.2010.01.031. |
[34] |
LI Y L, LIAO H L, QIANG S Z. Weighting ensemble least-square method for flutter derivatives of bridge decks [J]. Journal of wind engineering and industrial aerodynamics, 2003, 91(6): 713-721. DOI: 10.1016/S0167-6105(03)00002-3. |
[35] |
FANG F M, LI Y C, LIANG T C, et al. Investigation on the aerodynamic instability of a suspension bridge with a hexagonal cross-section [J]. Journal of the Chinese institute of engineers, 2007, 30(6): 1009-1022. DOI: 10.1080/02533839.2007.9671328. |
[36] |
李林, 李乔, 廖海黎. 桥梁断面静力三分力系数的人工神经网络识别 [J]. 西南交通大学学报, 2004, 39(6): 740-743,757. DOI: 10.3969/j.issn.0258-2724.2004.06.009.
LI L, LI Q, LIAO H L. Identification of static coefficients of bridge section with artificial neural network [J]. Journal of southwest Jiaotong university, 2004, 39(6): 740-743,757. DOI: 10.3969/j.issn.0258-2724.2004.06.009. |
[37] |
李林. 桥梁断面气动参数的人工神经网络识别 [D]. 成都: 西南交通大学, 2003.
LI L. Identification of aerodynamic parameters of bridge section based on artificial neural network [D]. Chengdu: Southwest Jiaotong University, 2003. |
[38] |
CHEN C H, WU J C, CHEN J H. Prediction of flutter derivatives by artificial neural networks [J]. Journal of wind engineering and industrial aerodynamics, 2008, 96(10/11): 1925-1937. DOI: 10.1016/j.jweia.2008.02.044. |
[39] |
黄继鸿, 苏红莲, 赵新华. 基于BP神经网络的翼型空气动力系数预测 [J]. 航空工程进展, 2010, 1(1): 36-39. DOI: 10.3969/j.issn.1674-8190.2010.01.009.
HUANG J H, SU H L, ZHAO X H. Aerodynamic coefficient prediction of airfoil using BP neural network [J]. Advances in aeronautical science and engineering, 2010, 1(1): 36-39. DOI: 10.3969/j.issn.1674-8190.2010.01.009. |
[40] |
陈讷郁, 葛耀君. 基于人工神经网络的典型桥梁断面气动参数识别 [J]. 土木工程学报, 2019, 52(8): 91-97,128. DOI: 10.15951/j.tmgcxb.2019.08.008.
CHEN N Y, GE Y J. Aerodynamic parameter identification of typical bridge sections based on artificial neural network [J]. China civil engineering journal, 2019, 52(8): 91-97,128. DOI: 10.15951/j.tmgcxb.2019.08.008. |
[41] |
张栋梁, 何锃, 乔厚, 等. 一种新的覆冰导线舞动非线性有限元分析方法 [J]. 固体力学学报, 2016, 37(5): 461-470. DOI: 10.19636/j.cnki.cjsm42-1250/o3.2016.05.007.
ZHANG D L, HE Z, QIAO H, et al. A new nonlinear finite element analysis method on the galloping of iced conductors [J]. Chinese journal of solid mechanics, 2016, 37(5): 461-470. DOI: 10.19636/j.cnki.cjsm42-1250/o3.2016.05.007. |
[42] |
王昕, 楼文娟. 覆冰导线舞动数值解及影响因素分析 [J]. 工程力学, 2010, 27(增刊1): 290-293,310.
WANG X, LOU W J. Numerical approach to the gallop of iced conductor [J]. Engineering mechanics, 2010, 27(Suppl. 1): 290-293,310. |
[43] |
胡霁, 郭若颖, 裴长生, 等. 特高压交流线路的单档和3档舞动计算分析 [J]. 高电压技术, 2013, 39(12): 3009-3014. DOI: 10.3969/j.issn.1003-6520.2013.12.024.
HU J, GUO R Y, PEI C S, et al. Calculative study on galloping of single-span and three-span UHV transmission lines [J]. High voltage engineering, 2013, 39(12): 3009-3014. DOI: 10.3969/j.issn.1003-6520.2013.12.024. |
[44] |
LIU X H, YAN B, ZHANG H Y, et al. Nonlinear numerical simulation method for galloping of iced conductor [J]. Applied mathematics and mechanics, 2009, 30(4): 489-510. DOI: 10.1007/s10483-009-0409-x. |
[45] |
KEUTGEN R, LILIEN J L. Benchmark cases for galloping with results obtained from wind tunnel facilities validation of a finite element model [J]. IEEE transactions on power delivery, 2000, 15(1): 367-374. DOI: 10.1109/61.847275. |
[46] |
GURUNG C B, YAMAGUCHI H, YUKINO T. Identification of large amplitude wind-induced vibration of ice-accreted transmission lines based on field observed data [J]. Engineering structures, 2002, 24(2): 179-188. DOI: 10.1016/S0141-0296(01)00089-X. |
[47] |
HU J, YAN B, ZHOU S, et al. Numerical investigation on galloping of iced quad bundle conductors [J]. IEEE transactions on power delivery, 2012, 27(2): 784-792. DOI: 10.1109/TPWRD.2012.2185252. |
[48] |
HUNG P V, YAMAGUCHI H, ISOZAKI M, et al. Large amplitude vibrations of long-span transmission lines with bundled conductors in gusty wind [J]. Journal of wind engineering and industrial aerodynamics, 2014, 126: 48-59. DOI: 10.1016/j.jweia.2014.01.002. |
[49] |
LIU X H, MIN G Y, WU C, et al. Investigation on influences of two discrete methods on galloping characteristics of iced quad bundle conductors [J]. Advances in civil engineering, 2020, 2020: 8818728. DOI: 10.1155/2020/8818728. |
[50] |
刘小会, 王家林, 严波. 空间大挠度Timoshenko梁的有限元计算方法 [J]. 重庆交通大学学报(自然科学版), 2013, 32(4): 564-568,588. DOI: 10.3969/j.issn.1674-0696.2013.04.04.
LIU X H, WANG J L, YAN B. FEM calculation of space Timoshenko beam of large deflection [J]. Journal of Chongqing Jiaotong university:natural science, 2013, 32(4): 564-568,588. DOI: 10.3969/j.issn.1674-0696.2013.04.04. |
[51] |
刘小会, 严波, 张宏雁, 等. 分裂导线舞动非线性有限元分析方法 [J]. 振动与冲击, 2010, 29(6): 129-133. DOI: 10.3969/j.issn.1000-3835.2010.06.031.
LIU X H, YAN B, ZHANG H Y, et al. Nonlinear finite element analysis for galloping of iced bundled conductors [J]. Journal of vibration and shock, 2010, 29(6): 129-133. DOI: 10.3969/j.issn.1000-3835.2010.06.031. |
[52] |
刘小会, 严波, 张宏雁, 等. 随机风场中覆冰四分裂导线舞动数值模拟 [J]. 振动与冲击, 2012, 31(13): 16-21. DOI: 10.3969/j.issn.1000-3835.2012.13.004.
LIU X H, YAN B, ZHANG H Y, et al. Numerical investigation on galloping of iced quad bundle conductor in stochastic wind field [J]. Journal of vibration and shock, 2012, 31(13): 16-21. DOI: 10.3969/j.issn.1000-3835.2012.13.004. |
[53] |
严波, 林雪松, 罗伟, 等. 绝缘子串风偏角风荷载调整系数的研究 [J]. 工程力学, 2010, 27(1): 221-227.
YAN B, LIN X S, LUO W, et al. Research on dynamic wind load factors for windage yaw angle of suspension insulator strings [J]. Engineering mechanics, 2010, 27(1): 221-227. |
[54] |
杨伦, 楼文娟, 潘小涛. 覆冰输电线路舞动的非线性数值分析 [J]. 深圳大学学报(理工版), 2013, 30(5): 495-503. DOI: 10.3724/SP.J.1249.2013.05495.
YANG L, LOU W J, PAN X T. Nonlinear numerical analysis for galloping of iced transmission lines [J]. Journal of Shenzhen university:science and engineering, 2013, 30(5): 495-503. DOI: 10.3724/SP.J.1249.2013.05495. |
[55] |
向玲, 张悦, 唐亮. 覆冰四分裂导线的气动特性和舞动特性分析 [J]. 中国工程机械学报, 2019, 17(4): 297-303. DOI: 10.15999/j.cnki.311926.2019.04.003.
XIANG L, ZHANG Y, TANG L. Analysis for aerodynamic characteristics and galloping behaviors of iced quad bundle conductor [J]. Chinese journal of construction machinery, 2019, 17(4): 297-303. DOI: 10.15999/j.cnki.311926.2019.04.003. |
[56] |
向玲, 周晨光, 唐亮. 不同档距四分裂线路的防舞仿真分析 [J]. 中国工程机械学报, 2019, 17(2): 127-133. DOI: 10.15999/j.cnki.311926.2019.02.007.
XIANG L, ZHOU C G, TANG L. Simulation of different span quad bundle transmission line's anti-galloping [J]. Chinese journal of construction machinery, 2019, 17(2): 127-133. DOI: 10.15999/j.cnki.311926.2019.02.007. |
[57] |
蔡萌琦, 徐倩, 周林抒, 等. 扇形覆冰特高压八分裂导线舞动特性分析 [J]. 力学与实践, 2018, 40(6): 630-638. DOI: 10.6052/1000-0879-18-061.
CAI M Q, XU Q, ZHOU L S, et al. Galloping behaviors of sector-shape iced eight bundle conductors [J]. Mechanics in engineering, 2018, 40(6): 630-638. DOI: 10.6052/1000-0879-18-061. |
[58] |
DEN HARTOG J P. Transmission line vibration due to sleet [J]. Transactions of the American institute of electrical engineers, 1932, 51(4): 1074-1076. DOI: 10.1109/T-AIEE.1932.5056223. |
[59] |
NIGOL O, BUCHAN P G. Conductor galloping part I-Den Hartog mechanism [J]. IEEE transactions on power apparatus and systems, 1981, PAS-100(2): 699-707. DOI: 10.1109/tpas.1981.316921. |
[60] |
NIGOL O, BUCHAN P G. Conductor galloping-part Ⅱ Torsional mechanism [J]. IEEE transactions on power apparatus and systems, 1981, PAS-100(2): 708-720. DOI: 10.1109/tpas.1981.316922. |
[61] |
YU P, POPPLEWELL N, SHAH A H. Instability trends of inertially coupled galloping: Part I: initiation [J]. Journal of sound and vibration, 1995, 183(4): 663-678. DOI: 10.1006/jsvi.1995.0278. |
[62] |
YU P, POPPLEWELL N, SHAH A H. Instability trends of inertially coupled galloping: Part Ⅱ: periodic vibrations [J]. Journal of sound and vibration, 1995, 183(4): 679-691. DOI: 10.1006/jsvi.1995.0179. |
[63] |
蔡廷湘. 输电线舞动新机理研究 [J]. 中国电力, 1998, 31(10): 62-66.
CAI T X. A new mechanism of transmission line galloping [J]. Electric power, 1998, 31(10): 62-66. |
[64] |
蒋扇英, 徐鉴. 奇异摄动方法在输电线非线性振动问题中的应用 [J]. 力学季刊, 2009, 30(1): 33-38.
JIANG S Y, XU J. Singular perturbation method and its application in nonlinear systems with fast and slow variables coupling [J]. Chinese quarterly of mechanics, 2009, 30(1): 33-38. |
[65] |
LUONGO A, PICCARDO G. Linear instability mechanisms for coupled translational galloping [J]. Journal of sound and vibration, 2005, 288(4/5): 1027-1047. DOI: 10.1016/j.jsv.2005.01.056. |
[66] |
LUONGO A, PICCARDO G. Non-linear galloping of sagged cables in 1: 2 internal resonance [J]. Journal of sound and vibration, 1998, 214(5): 915-940. DOI: 10.1006/jsvi.1998.1583. |
[67] |
LUONGO A, PICCARDO G. A continuous approach to the aeroelastic stability of suspended cables in 1: 2 internal resonance [J]. Journal of vibration and control, 2008, 14(1/2): 135-157. DOI: 10.1177/1077546307079404. |
[68] |
李欣业, 张华彪, 高仕赵, 等. 三自由度模型覆冰输电导线舞动的数值仿真分析 [J]. 河北工业大学学报, 2010, 39(3): 1-5. DOI: 10.3969/j.issn.1007-2373.2010.03.001.
LI X Y, ZHANG H B, GAO S Z, et al. Numerical analysis of galloping of iced power transmission lines [J]. Journal of Hebei university of technology, 2010, 39(3): 1-5. DOI: 10.3969/j.issn.1007-2373.2010.03.001. |
[69] |
李欣业, 张华彪, 侯书军, 等. 覆冰输电导线舞动的仿真分析 [J]. 振动工程学报, 2010, 23(1): 76-85. DOI: 10.3969/j.issn.1004-4523.2010.01.014.
LI X Y, ZHANG H B, HOU S J, et al. Theoretical and numerical analysis of galloping of iced power transmission lines [J]. Journal of vibration engineering, 2010, 23(1): 76-85. DOI: 10.3969/j.issn.1004-4523.2010.01.014. |
[70] |
侯磊, 陈予恕. 输电线路导线舞动中的混沌运动研究 [J]. 振动工程学报, 2014, 27(1): 75-83. DOI: 10.3969/j.issn.1004-4523.2014.01.011.
HOU L, CHEN Y S. Study on chaos in galloping of the transmission line [J]. Journal of vibration engineering, 2014, 27(1): 75-83. DOI: 10.3969/j.issn.1004-4523.2014.01.011. |
[71] |
刘小会, 闵光云, 严波, 等. 不同自由度下覆冰四分裂导线舞动特征分析 [J]. 力学季刊, 2020, 41(2): 370-383. DOI: 10.15959/j.cnki.0254-0053.2020.02.017.
LIU X H, MIN G Y, YAN B, et al. Analysis of galloping characteristics of iced quad bundle conductor with different degrees of freedom [J]. Chinese quarterly of mechanics, 2020, 41(2): 370-383. DOI: 10.15959/j.cnki.0254-0053.2020.02.017. |
[72] |
蔡君艳, 刘习军, 张素侠. 覆冰四分裂导线舞动近似解析解分析 [J]. 工程力学, 2013, 30(5): 305-310,316.
CAI J Y, LIU X J, ZHANG S X. Analysis of approximate analytical solution on galloping of iced quad bundle conductors [J]. Engineering mechanics, 2013, 30(5): 305-310,316. |
[73] |
郝淑英, 冯海茂, 范孜, 等. 覆冰输电线非线性瞬时固有频率研究 [J]. 工程力学, 2013, 30(9): 283-287.
HAO S Y, FENG H M, FAN Z, et al. Investigation of nolinear transient natural frequency of iced transmission line [J]. Engineering mechanics, 2013, 30(9): 283-287. |
[74] |
闵光云, 刘小会, 严波, 等. 多尺度法与平均法对新月形覆冰导线舞动特性的影响 [J]. 科学技术与工程, 2020, 20(32): 13206-13212. DOI: 10.3969/j.issn.1671-1815.2020.32.018.
MIN G Y, LIU X H, YAN B, et al. The influence of method of multiple scales and averaging on the galloping characteristics of the crescent iced conductor [J]. Science technology and engineering, 2020, 20(32): 13206-13212. DOI: 10.3969/j.issn.1671-1815.2020.32.018. |
[75] |
闵光云, 刘小会, 孙测世, 等. 覆冰导线驰振时其极限环幅值反馈控制 [J]. 科学技术与工程, 2020, 20(29): 11974-11979. DOI: 10.3969/j.issn.1671-1815.2020.29.022.
MIN G Y, LIU X H, SUN C S, et al. Control system about the amplitude of limit cycle as the galloping of iced conductor [J]. Science technology and engineering, 2020, 20(29): 11974-11979. DOI: 10.3969/j.issn.1671-1815.2020.29.022. |
[76] |
刘小会, 闵光云, 孙测世, 等. 两种连续系统离散方法对覆冰导线舞动方程解的精度影响 [J]. 噪声与振动控制, 2020, 40(5): 1-8. DOI: 10.3969/j.issn.1006-1355.2020.05.001.
LIU X H, MIN G Y, SUN C S, et al. Influence of two discrete methods of continuous systems on the accuracy of galloping equation solution of iced conductor [J]. Noise and vibration control, 2020, 40(5): 1-8. DOI: 10.3969/j.issn.1006-1355.2020.05.001. |
[77] |
晏致涛, 张海峰, 李正良. 基于增量谐波平衡法的覆冰输电线舞动分析 [J]. 振动工程学报, 2012, 25(2): 161-166. DOI: 10.16385/j.cnki.issn.1004-4523.2012.02.018.
YAN Z T, ZHANG H F, LI Z L. Galloping analysis of iced transmission lines based on incremental harmonic balance method [J]. Journal of vibration engineering, 2012, 25(2): 161-166. DOI: 10.16385/j.cnki.issn.1004-4523.2012.02.018. |
[78] |
吴钦宽. 输电线非线性振动问题的同伦映射近似解 [J]. 物理学报, 2011, 60(6): 068802. DOI: 10.7498/aps.60.068802.
WU Q K. Approximate solution of homotopic mapping for nonlinear vibration problem of transmission line [J]. Acta physica sinica, 2011, 60(6): 068802. DOI: 10.7498/aps.60.068802. |
[79] |
赵珧冰, 孙测世, 王志搴, 等. 悬索主共振响应的多尺度解与同伦分析解 [J]. 计算力学学报, 2014(5): 571-577. DOI: 10.7511/jslx201405005.
ZHAO Y B, SUN C S, WANG Z Q, et al. The solutions of primary resonance responses of suspended cables via the multiple scales method and homotopy analysis method [J]. Chinese journal of computational mechanics, 2014(5): 571-577. DOI: 10.7511/jslx201405005. |
[80] |
赵珧冰. 考虑温度效应的索梁结构建模及动力特性研究 [D]. 长沙: 湖南大学, 2015.
ZHAO Y B. Temperature effects on modeling and vibration properties of cable-stayed structures [D]. Changsha: Hunan University, 2015. |