Lagrange Differentiator

Version 1.0.0.0 (1.02 KB) by Jianwen Luo
The digital differentiator from the Lagrange interpolation.
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Updated 22 Jun 2005

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The digital differentiator from the Lagrange interpolation.
It is equivalent to the maximally flat low-pass digital differentiator,
or the degenerated form of Savitzky-Golay digital differentiator.

Author:
Jianwen Luo <luojw@ieee.org> 2006-06-17
Department of Biomedical Engineering,
Tsinghua University, Beijing 100084, P. R. China

References:
[1] Carlsson B.
Maximum Flat Digital Differentiator,
Electron. Lett. 1991, 27(8): 675-677.
[2] Kumar B, Roy S C D.
Coefficients of Maximally Linear, Fir Digital Differentiators for Low-Frequencies,
Electron. Lett. 1988, 24(9): 563-565.
[3] Selesnick I W.
Maximally flat low-pass digital differentiators,
IEEE Trans. Circuits Syst. II-Analog Digit. Signal Process. 2002, 49(3): 219-223.
[4] Khan I R, Okuda M, Ohba R.
Design of FIR digital differentiators using maximal linearity constraints,
IEICE Trans. Fundam. Electron. Commun. Comput. Sci. 2004, E87A(8): 2010-2017.
[5] Luo J W, Ying K, He P, Bai J.
Properties of Savitzky-Golay digital differentiators,
Digit. Signal Prog. 2005, 15(2): 122-136.
[6] Luo J W, Ying K, Bai J.
Savitzky-Golay smoothing and differentiation filter for even number da,
Signal Process. 2005, 85(7): 1429-1434

Cite As

Jianwen Luo (2024). Lagrange Differentiator (https://www.mathworks.com/matlabcentral/fileexchange/7865-lagrange-differentiator), MATLAB Central File Exchange. Retrieved .

MATLAB Release Compatibility
Created with R14SP1
Compatible with any release
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Version Published Release Notes
1.0.0.0

correct a typo.