-
Owing to the random bundling of the cable bundle, the different conductors within the cable present non-parallel distribution structural features. Such a structural feature leads to different cross-sectional structures at different positions along the line. The variations of spacing between different conductors and the height from the ground can lead the distribution parameters to change. This requires that when solving the electromagnetic coupling of the cable bundle, the cable bundle should be divided into multiple grid segments along the line, and the distribution parameters should be calculated according to the cross-sectional geometry information at different grid segment positions. On the basis of the integration of the transmission line model and the distributed parameter model, the distribution parameters of different mesh segments are calculated according to the cross-sectional structure of different mesh segments of the cable in this paper. When the parameters are brought into the transmission line model, an electromagnetic coupling model suitable for non-parallel cable structures is established. In order to verify the accuracy of the model, a unit cable structure from real cable with non-parallel distribution characteristics is designed. The calculation results from the proposed model are compared with the calculation results from the full-wave algorithm and the experimental results, showing they are in good agreement with each other. In order to understand the influence of the cable non-parallel structure characteristics on the response of electromagnetic coupling to cable, the comparison of electromagnetic coupling response results between the parallel cable and non-parallel cable structures are made and analyzed, showing that the non-parallel structure characteristics of the cable have a significant effect on the electromagnetic coupling. It is confirmed that the influence of the non-parallel cable structure characteristics must be considered in the electromagnetic coupling simulation of the real cable. -
Keywords:
- cable bundle /
- transmission line model /
- distribution parameter /
- method of moment
[1] Taylor C D, Satterwhite R, Harrision C W 1965 IEEE Trans. Antennas Propagat. 13 987Google Scholar
[2] Agrawal A K, Price H J, Gurbaxani S H 1980 IEEE Trans. Electromagn. Compat. 22 119Google Scholar
[3] Rachidi F 1993 IEEE Trans. Electromagn. Compat. 35 404Google Scholar
[4] 叶志红, 张杰, 周健健, 苟胆 2020 物理学报 69 060701Google Scholar
Ye Z H, Zhang J, Zhou J J, Gou D 2020 Acta Phys. Sin. 69 060701Google Scholar
[5] 肖培, 李佳维, 贺佳港, 李锦新, 刘柱, 李高升 2021 物理学报 70 100702Google Scholar
Xiao P, Li J W, He J G, Li J X, Liu Z, Li G S 2021 Acta Phys. Sin. 70 100702Google Scholar
[6] 吴振军, 王丽芳, 廖承林 2009 物理学报 59 6146Google Scholar
Wu Z J, Wang L F, Liao C L 2009 Acta Phys. Sin. 59 6146Google Scholar
[7] 孙亚秀, 卓庆坤, 姜庆辉, 李千 2015 物理学报 64 044102Google Scholar
Sun Y X, Zhuo Q K, Jiang Q H, Li Q 2015 Acta Phys. Sin. 64 044102Google Scholar
[8] Spadacini G, Grassi F, Pignari S A 2013 China Commun. 10 119Google Scholar
[9] Spadacini G, Grassi F, Pignari S A 2015 IEEE Trans. Electromagn. Compat. 57 1246Google Scholar
[10] Wu M L, Beetner D G, Hubing T H, Ke H X, Sun S H 2009 IEEE Trans. Electromagn. Compat. 51 842Google Scholar
[11] Li X, Wu M L, Beetner D, Hubing T 2010 IEEE International Symposium on Electromagnetic Compatibility Florida, USA, July 25–30, 2010 p614
[12] Clements J C, Paul C R, Adams A T 1975 IEEE Trans. Electromagn. Compat. 10 238Google Scholar
[13] Giri D V, Tesche F M, Chang S K 1979 IEEE Trans. Electromagn. Compat. 21 220Google Scholar
[14] Savage J S, Smith W T 1995 IEEE Trans. Electromagn. Compat. 37 131Google Scholar
[15] Li G H, Hess G, Hoeckele R, Davidson S, Jalbert P, Victor V 2015 IEEE Trans. Electromagn. Compat. 57 827Google Scholar
[16] Sun S S, Liu G P, Drewniak J L, Pommerenke D J 2007 IEEE Trans. Electromagn. Compat. 49 708Google Scholar
[17] Pignari S A, Spadacini G, Grassi F 2017 IEEE Electromagn. Compat. Magazine 6 85Google Scholar
[18] 魏兵, 李小勇, 王飞, 葛德彪 2009 物理学报 58 6174Google Scholar
Wei B, Li X Y, Wang F, Ge D B 2009 Acta Phys. Sin. 58 6174Google Scholar
[19] 魏兵, 葛德彪, 王飞 2008 物理学报 57 6290Google Scholar
Wei B, Ge D B, Wang F 2008 Acta Phys. Sin. 57 6290Google Scholar
[20] 葛德彪, 闫玉波 2005 电磁波时域有限差分方法 (第二版) (西安: 西安电子科技大学出版社) 第11—13页
Ge D B, Yan Y B 2005 Finite Difference Time Domain Method for Electromagnetic Waves (2nd Ed) (Xi’an: Xidian University Press) pp11–13 (in Chinese)
[21] 邓莉亭, 钟龙权, 刘强, 孙子涵, 闫丽萍, 赵翔 2021 强激光与粒子束 33 083002Google Scholar
Deng L T, Zhong L Q, Liu Q, Sun Z H, Yan L P, Zhao X 2021 High Power Laser and Particle Beams 33 083002Google Scholar
-
图 5 理想导电板上6导线计算模型串扰结果对比 (a) 1线近端串扰; (b) 1线远端串扰; (c) 2线近端串扰; (d) 2线远端串扰; (e) 4线近端串扰; (f) 4线远端串扰; (g) 5线近端串扰; (h) 5线远端串扰; (i) 6线近端串扰; (j) 6线远端串扰
Figure 5. Comparison of six-conductor crosstalk results: (a) NEXT of conductor 1; (b) FEXT of conductor 1; (c) NEXT of conductor 2; (d) FEXT of conductor 2; (e) NEXT of conductor 4; (f) FEXT of conductor 4; (g) NEXT of conductor 5; (h) FEXT of conductor 5; (i) NEXT of conductor 6; (j) FEXT of conductor 6.
表 1 不同线缆电磁耦合计算方法的计算时间对比
Table 1. Comparison of the cable coupling computation time with different methods.
算例 线缆电磁耦合模型/s FDTD算法/s 算例1: 非平行3导线 12 30 算例2: 非平行6导线 13 35 -
[1] Taylor C D, Satterwhite R, Harrision C W 1965 IEEE Trans. Antennas Propagat. 13 987Google Scholar
[2] Agrawal A K, Price H J, Gurbaxani S H 1980 IEEE Trans. Electromagn. Compat. 22 119Google Scholar
[3] Rachidi F 1993 IEEE Trans. Electromagn. Compat. 35 404Google Scholar
[4] 叶志红, 张杰, 周健健, 苟胆 2020 物理学报 69 060701Google Scholar
Ye Z H, Zhang J, Zhou J J, Gou D 2020 Acta Phys. Sin. 69 060701Google Scholar
[5] 肖培, 李佳维, 贺佳港, 李锦新, 刘柱, 李高升 2021 物理学报 70 100702Google Scholar
Xiao P, Li J W, He J G, Li J X, Liu Z, Li G S 2021 Acta Phys. Sin. 70 100702Google Scholar
[6] 吴振军, 王丽芳, 廖承林 2009 物理学报 59 6146Google Scholar
Wu Z J, Wang L F, Liao C L 2009 Acta Phys. Sin. 59 6146Google Scholar
[7] 孙亚秀, 卓庆坤, 姜庆辉, 李千 2015 物理学报 64 044102Google Scholar
Sun Y X, Zhuo Q K, Jiang Q H, Li Q 2015 Acta Phys. Sin. 64 044102Google Scholar
[8] Spadacini G, Grassi F, Pignari S A 2013 China Commun. 10 119Google Scholar
[9] Spadacini G, Grassi F, Pignari S A 2015 IEEE Trans. Electromagn. Compat. 57 1246Google Scholar
[10] Wu M L, Beetner D G, Hubing T H, Ke H X, Sun S H 2009 IEEE Trans. Electromagn. Compat. 51 842Google Scholar
[11] Li X, Wu M L, Beetner D, Hubing T 2010 IEEE International Symposium on Electromagnetic Compatibility Florida, USA, July 25–30, 2010 p614
[12] Clements J C, Paul C R, Adams A T 1975 IEEE Trans. Electromagn. Compat. 10 238Google Scholar
[13] Giri D V, Tesche F M, Chang S K 1979 IEEE Trans. Electromagn. Compat. 21 220Google Scholar
[14] Savage J S, Smith W T 1995 IEEE Trans. Electromagn. Compat. 37 131Google Scholar
[15] Li G H, Hess G, Hoeckele R, Davidson S, Jalbert P, Victor V 2015 IEEE Trans. Electromagn. Compat. 57 827Google Scholar
[16] Sun S S, Liu G P, Drewniak J L, Pommerenke D J 2007 IEEE Trans. Electromagn. Compat. 49 708Google Scholar
[17] Pignari S A, Spadacini G, Grassi F 2017 IEEE Electromagn. Compat. Magazine 6 85Google Scholar
[18] 魏兵, 李小勇, 王飞, 葛德彪 2009 物理学报 58 6174Google Scholar
Wei B, Li X Y, Wang F, Ge D B 2009 Acta Phys. Sin. 58 6174Google Scholar
[19] 魏兵, 葛德彪, 王飞 2008 物理学报 57 6290Google Scholar
Wei B, Ge D B, Wang F 2008 Acta Phys. Sin. 57 6290Google Scholar
[20] 葛德彪, 闫玉波 2005 电磁波时域有限差分方法 (第二版) (西安: 西安电子科技大学出版社) 第11—13页
Ge D B, Yan Y B 2005 Finite Difference Time Domain Method for Electromagnetic Waves (2nd Ed) (Xi’an: Xidian University Press) pp11–13 (in Chinese)
[21] 邓莉亭, 钟龙权, 刘强, 孙子涵, 闫丽萍, 赵翔 2021 强激光与粒子束 33 083002Google Scholar
Deng L T, Zhong L Q, Liu Q, Sun Z H, Yan L P, Zhao X 2021 High Power Laser and Particle Beams 33 083002Google Scholar
Catalog
Metrics
- Abstract views: 3474
- PDF Downloads: 61
- Cited By: 0