时基误差严重影响宽带取样示波器的高精准测量,但对时基误差进行精确估计和补偿极为困难。针对宽带取样示波器的时基误差(含时基失真与抖动引起的误差),首次运用正交距离回归算法对宽带取样示波器时基误差进行估计。对比多相位、多频率最小二乘法,该方法仅用一组近似正交的正弦信号对宽带取样示波器的时基误差进行有效估计,实现了对测量信号的时基补偿,得出了低于0.3ps的时基误差,显著提高了宽带取样示波器测量准确度。
Abstract
Time-based errors seriously affect the accurate measurement of broadband sampling oscilloscopes, but it is extremely difficult to accurately estimate and compensate for time-base errors. For the time-base error of broadband sampling oscilloscope (including time-base distortion and jitter-induced error), the orthogonal time-regression algorithm is used to estimate the time-base error of oscilloscope for the first time. Compared with the multi-phase and multi-frequency least squares method,only to uses a set of approximately orthogonal sinusoidal signals to effectively estimate the time base error of the broadband sampling oscilloscope, and realizes the time base compensation of the measured signals. A time base error of less than 0.3ps is obtained, which significantly improves the measurement accuracy of the broadband sampling oscilloscope.
关键词
计量学 /
时基误差 /
宽带取样示波器 /
正交距离回归 /
同步测量
Key words
metrology /
time base error /
broadband sampling oscilloscope /
orthogonal distance regression /
synchronous measurement
{{custom_sec.title}}
{{custom_sec.title}}
{{custom_sec.content}}
参考文献
[1]朱江淼, 杨洁, 缪京元, 等. 基于光脉冲源的脉冲标准法中的时基漂移去除[J]. 计量技术, 2016, (6): 6-11.
Zhu J M, Yang J, Miao J Y, et al. Time-base drift removal in pulse standard method based on optical pulse source[J]. Measurement Technique, 2016, (6): 6-11.
[2]梁志国. 正弦波拟合参数的不确定度评定[J]. 计量学报, 2018, 39(6): 888-894.
Liang Z G. The Measurement Uncertainty of Curve-fit Parameters of Sinusoidal[J]. Acta Metrologica Sinica, 2018, 39(6): 888-894.
[3]林茂六, 张喆. 高速采样示波器中的时基失真及其估计[J]. 计量学报, 2004, 25(3): 266-269.
Lin M L, Zhang J. The TBD Introduction and Estimation of High-speed Sampling Oscilloscope[J]. Acta Metrologica Sinica, 2004, 25(3): 266-269.
[4]朱江淼, 李然, 缪京元, 等. 高速取样示波器时基失真数学模型的研究与仿真[J]. 北京工业大学学报, 2013, 39(12): 1810-1814.
Zhu J M, Li R, Miao J Y, et al. Time-based Distortion Correction Algorithm of High-speed Sampling Oscilloscope[J]. Journal of Beijing University of Technology, 2013, 39(12): 1810-1814.
[5]Wang C M, Hale P D, Coakley K J. Least-Squares Estimation of Time-Base Distortion of Sampling Oscilloscopes[J]. IEEE Transactions on Instrumentation and Measurement, 1999, 48(6): 1324-1332.
[6]朱江淼, 赵琳潇, 缪京元, 等. 基于光脉冲源的标准脉冲法的宽带取样示波器校准技术研究[J]. 电子学报, 2018, 46(4): 945-951.
Zhu J M, Zhao L X, Miao J Y, et al. Research on the Calibration Technology of Broadband Sampling Oscilloscope Based on the Standard Puls Source[J]. Acta Electronica Sinica, 2018, 46(4): 945-951.
[7]Liu M L, Zhao Y, Zhu J M, et al. A New Probability Density Function Feconvolution Method to Remove the Timing jitter[J]. Proceedings of the IEEE 6th Circuits and Systems Symposium: Mobile and Wireless Communication, 2004, (2), 413-416.
[8]高源, 朱江淼, 缪京元, 等. 基于EEMD算法的高速取样示波器时基抖动的去除[J]. 计量技术, 2012, (11): 15-19.
Gao Y, Zhu J M, Miao J Y, et al. Time-base Jitter Removal of High-speed Sampling Oscilloscope Based on EEMD Algorithm[J]. Metrologica Sinica, 2012, (11): 15-19.
[9]梁志国,杨仁福. 数字示波器大触发延迟时间的变频测量方法[J]. 计量学报, 2018, 39(2): 268-271.
Liang Z G, Yang R F. A Novel Multi-frequency Measurement Method for Large Trigger Delay of Digital Oscilloscopes[J]. Acta Metrologica Sinica, 2018, 39(2): 268-271.
[10]Boggs P T, Byrd R H, Schnabe R B. A Stable and Efficient Algorithm for Nonlinear Orthogonal Distance Regression[J]. Siam Journal on Scientific & Statistical Computing, 2006, 8(6): 1052-1078.
[11]Wang C M, Hale P D, Coakley K J. Least-Squares Estimation of Time-Base Distortion of Sampling Oscilloscopes[J]. IEEE Transactions on Instrumentation and Measurement, 1999, 48(6): 1324-1332.
[12]朱江淼, 王园. 高速取样示波器时基失真数据获取系统的构建[J]. 北京工业大学学报, 2014, 40(4): 509-513.
Zhu J M, Wang Y. Construction of Data Acquisition System of Time-based Distortion for High-speed Sampling Oscilloscope[J]. Journal of Beijing University of Technology, 2014, 40(4): 509-513.
[13]Zwolak J W, Boggs P T, Watson L T. Algorithm 869: ODRPACK95: A Weighted Orthogonal Distance Regression Code with Bound Constraints[J]. ACM Transactions on Mathematical Software, 2007, 33(4). https://doi.org/10.1145/1268776.1268782.
[14]Andrew R Conn, Nicholas I M Gould, Philippe L T. Trust-Region Methods[M]. Philadelphia: SIAM, 2000.
基金
国家科技支撑计划(2014BAK02B03);质检公益性行业项目(20140010)
PDF(832 KB)
