Are equiripple digital FIR filters always optimal with minimax error criterion?

C.-Y. Tseng; L.J. Griffiths

doi:10.1109/97.295312

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Are equiripple digital FIR filters always optimal with minimax error criterion?

C.-Y. Tseng L.J. Griffiths

Year: 1994 Journal: IEEE Signal Processing Letters Vol: 1 (1)Pages: 5-8 Publisher: Institute of Electrical and Electronics Engineers

DOI: 10.1109/97.295312

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Abstract

For exact linear phase digital finite impulse response (FIR) filters, it is well known that a filter with equiripple error function must be optimal with the minimax (Chebyshev) error criterion. The present letter points out that such analogy is not true for FIR filters which approximate arbitrarily specified magnitude and phase responses.< >

Keywords:

Minimax Finite impulse response Chebyshev filter Mathematics Digital filter Linear phase Algorithm Low-pass filter Control theory (sociology) Filter (signal processing) Applied mathematics Computer science Mathematical optimization Mathematical analysis Artificial intelligence

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Digital Filter Design and Implementation

Physical Sciences → Computer Science → Signal Processing

Advanced Adaptive Filtering Techniques

Physical Sciences → Engineering → Computational Mechanics

Analog and Mixed-Signal Circuit Design

Physical Sciences → Engineering → Biomedical Engineering

Are equiripple digital FIR filters always optimal with minimax error criterion?

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