Abstract :
FIR filters are known to be stable and have a linear phase when symmetry properties, e.g., h[n]=h[M-n], are kept. A common FIR filter design method is the Parks-McClellan algorithm. In this algorithm, linear phase FIR filters, which are optimal in the minimax sense, are designed. These filters have the form of H(ω)=A(ω)ej(β-ωα), where A(ω) is real, α is an integer or an integer plus 1/2 and β is 0 or π/2. These FIR filters are always symmetric or antisymmetric. We introduce a simple procedure for designing almost linear phase FIR filters, having a similar form to H(ω), but an arbitrary α, that are optimal in a similar sense.
Keywords :
FIR filters; discrete Fourier transforms; linear phase filters; minimax techniques; FIR filters; Parks-McClellan algorithm; antisymmetric filters; discrete time Fourier transform; linear phase filters; minimax method; symmetric filters; Algorithm design and analysis; Chebyshev approximation; Delay; Electronic mail; Equations; Finite impulse response filter; Low pass filters; Minimax techniques; Nonlinear filters; Passband;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 2003. Proceedings. (ICASSP '03). 2003 IEEE International Conference on
