Minimum phase finite impulse response filter design
Abstract
The design of minimum phase finite impulse response (FIR) filters is considered. The
study demonstrates that the residual errors achieved by current state‐of‐the‐art design
methods are nowhere near the smallest error possible on a finite resolution digital
computer. This is shown to be due to conceptual errors in the literature pertaining to
what constitutes a factorable linear phase filter. This study shows that factorisation is
possible with a zero residual error (in the absence of machine finite resolution error) if the
linear operator or matrix representing the linear phase filter is positive definite. Methodology
is proposed able to design a minimum phase filter that is optimal—in the sense
that the residual error is limited only by the finite precision of the digital computer, with
no systematic error. The study presents practical application of the proposed methodology
by designing two minimum phase Chebyshev FIR filters. Results are compared to
state‐of‐the‐art methods from the literature, and it is shown that the proposed methodology
is able to reduce currently achievable residual errors by several orders of
magnitude.
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- Faculty of Engineering [1129]