一种用于莫尔信号数字细分的改进cordic

IF 1 4区 工程技术 Q4 INSTRUMENTS & INSTRUMENTATION
Weibin Zhu, Shengjin Ye, Yao Huang, Z. Xue
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引用次数: 5

摘要

光栅制造技术的限制与高分辨率测量要求之间的矛盾一直是人们关注的焦点。短句来源重点讨论了红外信号数字细分处理过程中角度计算的精度要求,分析了反正弦函数求解误差的原因,在详细讨论传统坐标旋转数字计算机(CORDIC)原理的基础上,提出了一种改进的双旋转迭代坐标旋转数字计算机(CORDIC)。由于改进的CORDIC的迭代次数和数据宽度受到数字电路资源有限的限制,直接决定了计算精度,因此对改进的CORDIC的总体量化误差(OQE)进行了分析。推导了算法的近似误差和舍入误差,建立了迭代次数和数据宽度的误差模型。通过一个细分电路的仿真和实验,验证了改进的CORDIC的有效性和应用价值。通过量化证明了近似误差、舍入误差与迭代次数、位宽之间的对应关系。通过标定实验,得到改进的CORDIC细分误差在±0.5”以内,平均方差为0.2”。研究结果可直接应用于数字细分系统,指导迭代过程中的参数设置,对误差分离和误差综合的定量分析具有重要意义。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
An improved cordic for digital subdivision of Moiré signal
The contradiction between the restriction of grating manufacturing technology and high-resolution measurement requirements has been the focus of attention. The precision requirement of angle calculation during the digital subdivision processing of a Moiré signal is focused on, the causes of errors in the solution of arcsine function are analysed, and an improved coordinate rotation digital computer (CORDIC) with double-rotation iteration is proposed by discussing the principle of the conventional CORDIC in detail herein. Because the iterative number and data width of the improved CORDIC are limited by the finite digital circuit resources and thus determine the calculation accuracy directly, subsequently the overall quantization error (OQE) of the improved CORDIC is analysed. The approximate error and rounding error of the algorithm are deduced, and the error models of iterative number and data width are established. The validity and application value of the improved CORDIC are proved through simulations and experiments involving a subdividing circuit. The corresponding relation between the approximate error, rounding error and iteration number, as well as the bit width are proved by quantization. The error of subdivision with the improved CORDIC, obtained through a calibration experiment, is within ±0.5′′ and the mean variance is 0.2′′. The results of the research can be applied directly to a digital subdivision system to guide the parameter setting in the iterative process, which is of crucial importance in the quantitative analysis of error separation and error synthesis.
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来源期刊
Metrology and Measurement Systems
Metrology and Measurement Systems INSTRUMENTS & INSTRUMENTATION-
CiteScore
2.00
自引率
10.00%
发文量
0
审稿时长
6 months
期刊介绍: Contributions are invited on all aspects of the research, development and applications of the measurement science and technology. The list of topics covered includes: theory and general principles of measurement; measurement of physical, chemical and biological quantities; medical measurements; sensors and transducers; measurement data acquisition; measurement signal transmission; processing and data analysis; measurement systems and embedded systems; design, manufacture and evaluation of instruments. The average publication cycle is 6 months.
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