"21230" . "Robustn\u00ED analytick\u00FD n\u00E1vrh h\u0159ebenov\u00FDch FIR filtr\u016F se stejnom\u011Brn\u00FDm zvln\u011Bn\u00EDm"@cs . . . . "Piscataway" . "Robust Analytical Design of Equiripple Comb FIR"@en . "RIV/68407700:21230/08:03145071" . "Robustn\u00ED analytick\u00FD n\u00E1vrh h\u0159ebenov\u00FDch FIR filtr\u016F se stejnom\u011Brn\u00FDm zvln\u011Bn\u00EDm"@cs . . . "ISCAS 2008" . "4"^^ . "Seattle" . . "Z(MSM6840770014)" . "Robust Analytical Design of Equiripple Comb FIR" . . "Robust Analytical Design of Equiripple Comb FIR"@en . "393047" . . "RIV/68407700:21230/08:03145071!RIV09-MSM-21230___" . . . "FIR comb filters; analytical design"@en . . "2008-05-18+02:00"^^ . . "IEEE" . . "Zahradn\u00EDk, Pavel" . "[04121B21B2F4]" . . "Robustn\u00ED analytick\u00FD n\u00E1vrh h\u0159ebenov\u00FDch FIR filtr\u016F se stejnom\u011Brn\u00FDm zvln\u011Bn\u00EDm"@cs . "Robust Analytical Design of Equiripple Comb FIR" . . "Vl\u010Dek, Miroslav" . "2"^^ . "An analytical design method for highly selective digital optimal equiripple comb FIR filters is presented. The equiripple comb FIR filters are optimal in the Chebyshev sense. The number of notch bands, the width of the notch bands and the attenuation in the passbands can be independently specified. The degree formula and the differential equation for the generating polynomial of the filter is presented. Based on the differential equation, a fast recursive procedure for the evaluation of the impulse response of the filter is described. Its arithmetic robustness outperforms by far the known analytical design method. Highly selective equiripple comb FIR filters can be designed. One example demonstrates the robustness of the filter design." . "000258532101013" . "2"^^ . "978-1-4244-2078-0" . "An analytical design method for highly selective digital optimal equiripple comb FIR filters is presented. The equiripple comb FIR filters are optimal in the Chebyshev sense. The number of notch bands, the width of the notch bands and the attenuation in the passbands can be independently specified. The degree formula and the differential equation for the generating polynomial of the filter is presented. Based on the differential equation, a fast recursive procedure for the evaluation of the impulse response of the filter is described. Its arithmetic robustness outperforms by far the known analytical design method. Highly selective equiripple comb FIR filters can be designed. One example demonstrates the robustness of the filter design."@en . . "0277-674X" .