匹配Z变换方法

匹配Z变换方法（matched Z-transform method）也称为极点-零点映射（pole–zero mapping）^[1]^[2]或极点－零点匹配法（pole–zero matching method）^[3]，简称MPZ或MZT^[4]，是将连续时间（英语：Discrete_time_and_continuous_time）滤波器转换到离散时间滤波器（数字滤波器）设计的技巧。

其作法是将所有的s平面设计时的极点和零点转换到z平面的位置 $z=e^{sT}$ ，其中取样周期 $T=1/f_{\mathrm {s} }$ ^[5]。因此以下传递函数的类比滤波器：

H(s)=k_{\mathrm {a} }{\frac {\prod _{i=1}^{M}(s-\xi _{i})}{\prod _{i=1}^{N}(s-p_{i})}}

会转换为以下的数位传递函数

H(z)=k_{\mathrm {d} }{\frac {\prod _{i=1}^{M}(1-e^{\xi _{i}T}z^{-1})}{\prod _{i=1}^{N}(1-e^{p_{i}T}z^{-1})}}

其增益 $k_{\mathrm {d} }$ 需调整，使结果为其理想的增益，一般会和类比滤波器的直流增益匹配，透过设定 $s=0$ 及 $z=1$ ，并且求解 $k_{\mathrm {d} }$ .^[3]^[6]。

因为此映射会将s平面的 $j\omega$ 轴反复的映射到z平面的单位圆上，若零点或是极点超过奈奎斯特频率，其映射后的位置会有混叠的情形^[7]。

一般情形下，类比滤波器的极点会比零点多，在 $s=\infty$ 处的零点可以移到奈奎斯特频率，作法是放在 $z=-1$ 的位置^[1]^[3]^[6]^[7]。

此转换方式可以保持有界输入有界输出稳定性以及最小相位，但不会保持时域或是频域的响应，因此不常使用^[8]^[7]。较常使用的方式有双线性转换及冲激不变法^[4]。匹配Z变换方法的高频响应误差比双线性转换要小，因此比较容易透过加入额外的零点来修正其特性，此方式称为MZTi（i表示改良版improved）^[9]。

在数位控制中，匹配Z变换方法有一个特别的应用，就是艾克曼公式（英语：Ackermann's formula），可以调整可控制性系统的极点，一般会将不稳定（或接近不稳定）的极点调整到稳定的位置。

参考资料

^ ^1.0 ^1.1 Won Young Yang. Signals and Systems with MATLAB. Springer. 2009: 292 [2018-10-19]. ISBN 978-3-540-92953-6. （原始内容存档于2017-09-20）.
^ Bong Wie. Space vehicle dynamics and control. AIAA. 1998: 151 [2018-10-19]. ISBN 978-1-56347-261-9. （原始内容存档于2015-03-26）.
^ ^3.0 ^3.1 ^3.2 Arthur G. O. Mutambara. Design and analysis of control systems. CRC Press. 1999: 652 [2018-10-19]. ISBN 978-0-8493-1898-6. （原始内容存档于2019-07-30）.
^ ^4.0 ^4.1 Al-Alaoui, M. A. Novel Approach to Analog-to-Digital Transforms. IEEE Transactions on Circuits and Systems I: Regular Papers. February 2007, 54 (2): 338–350 [2018-10-19]. ISSN 1549-8328. doi:10.1109/tcsi.2006.885982. （原始内容存档于2018-06-04）.
^ S. V. Narasimhan and S. Veena. Signal processing: principles and implementation. Alpha Science Int'l Ltd. 2005: 260 [2018-10-19]. ISBN 978-1-84265-199-5. （原始内容存档于2019-07-28）.
^ ^6.0 ^6.1 Franklin, Gene F. Feedback control of dynamic systems. Powell, J. David, Emami-Naeini, Abbas Seventh. Boston: Pearson. 2015: 607–611 [2018-10-19]. ISBN 0133496597. OCLC 869825370. （原始内容存档于2024-02-14）. Because physical systems often have more poles than zeros, it is useful to arbitrarily add zeros at z = -1.
^ ^7.0 ^7.1 ^7.2 Rabiner, Lawrence R; Gold, Bernard. Theory and application of digital signal processing. Englewood Cliffs, New Jersey: Prentice-Hall. 1975: 224–226. ISBN 0139141014 （英语）. The expediency of artificially adding zeros at z = —1 to the digital system has been suggested ... but this ad hoc technique is at best only a stopgap measure. ... In general, use of impulse invariant or bilinear transformation is to be preferred over the matched z transformation.
^ Jackson, Leland B. Digital Filters and Signal Processing. Springer Science & Business Media. 1996: 262. ISBN 9780792395591 （英语）. although perfectly usable filters can be designed in this way, no special time- or frequency-domain properties are preserved by this transformation, and it is not widely used.
^ Ojas, Chauhan; David, Gunness. Optimizing the Magnitude Response of Matched Z-Transform Filters ("MZTi") for Loudspeaker Equalization. Audio Engineering Society. 2007-09-01 [2018-10-19]. （原始内容存档于2019-07-27）（英语）.

[:3-1] 1.0 ^1.1 Won Young Yang. Signals and Systems with MATLAB. Springer. 2009: 292 [2018-10-19]. ISBN 978-3-540-92953-6. （原始内容存档于2017-09-20）.

[2] Bong Wie. Space vehicle dynamics and control. AIAA. 1998: 151 [2018-10-19]. ISBN 978-1-56347-261-9. （原始内容存档于2015-03-26）.

[:1-3] 3.0 ^3.1 ^3.2 Arthur G. O. Mutambara. Design and analysis of control systems. CRC Press. 1999: 652 [2018-10-19]. ISBN 978-0-8493-1898-6. （原始内容存档于2019-07-30）.

[:4-4] 4.0 ^4.1 Al-Alaoui, M. A. Novel Approach to Analog-to-Digital Transforms. IEEE Transactions on Circuits and Systems I: Regular Papers. February 2007, 54 (2): 338–350 [2018-10-19]. ISSN 1549-8328. doi:10.1109/tcsi.2006.885982. （原始内容存档于2018-06-04）.

[5] S. V. Narasimhan and S. Veena. Signal processing: principles and implementation. Alpha Science Int'l Ltd. 2005: 260 [2018-10-19]. ISBN 978-1-84265-199-5. （原始内容存档于2019-07-28）.

[:2-6] 6.0 ^6.1 Franklin, Gene F. Feedback control of dynamic systems. Powell, J. David, Emami-Naeini, Abbas Seventh. Boston: Pearson. 2015: 607–611 [2018-10-19]. ISBN 0133496597. OCLC 869825370. （原始内容存档于2024-02-14）. Because physical systems often have more poles than zeros, it is useful to arbitrarily add zeros at z = -1.

[:0-7] 7.0 ^7.1 ^7.2 Rabiner, Lawrence R; Gold, Bernard. Theory and application of digital signal processing. Englewood Cliffs, New Jersey: Prentice-Hall. 1975: 224–226. ISBN 0139141014 （英语）. The expediency of artificially adding zeros at z = —1 to the digital system has been suggested ... but this ad hoc technique is at best only a stopgap measure. ... In general, use of impulse invariant or bilinear transformation is to be preferred over the matched z transformation.

[8] Jackson, Leland B. Digital Filters and Signal Processing. Springer Science & Business Media. 1996: 262. ISBN 9780792395591 （英语）. although perfectly usable filters can be designed in this way, no special time- or frequency-domain properties are preserved by this transformation, and it is not widely used.

[9] Ojas, Chauhan; David, Gunness. Optimizing the Magnitude Response of Matched Z-Transform Filters ("MZTi") for Loudspeaker Equalization. Audio Engineering Society. 2007-09-01 [2018-10-19]. （原始内容存档于2019-07-27）（英语）.

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