"P(OC 276.001)" . . "Vl\u010Dek, Miroslav" . . "Design of IIR Equiripple Filters in z-Domain" . . "RIV/68407700:21230/05:03112391!RIV06-MSM-21230___" . "Design of IIR Equiripple Filters in z-Domain"@en . "1-4244-0050-3" . . "neuvedeno" . "Design of IIR Equiripple Filters in z-Domain" . . "Nen\u00ED k dispozici"@cs . "Piscataway" . "[F7DA871D15AF]" . . "IIR; filters"@en . "The analytical solution in the z domain is presented for an IIR complementary filter pair which exhibits optimum equiripple behaviour of the frequency response over both bands. The solution gives a direct decomposition of the transfer function into two all-passes and provides an easy access to the design formulae for lattice wave digital filters refraining from the continuos-time counterparts. The multiplier coefficients are obtained in a simple algebraic form comprising the zeros and real pole of the transfer function only. The bireciprocal case represented by the transfer function with purely imaginary poles is also included. Design examples and computer simulations of wave digital lattices are presented."@en . . "Design of IIR Equiripple Filters in z-Domain"@en . . . "517397" . . "2"^^ . . . "The analytical solution in the z domain is presented for an IIR complementary filter pair which exhibits optimum equiripple behaviour of the frequency response over both bands. The solution gives a direct decomposition of the transfer function into two all-passes and provides an easy access to the design formulae for lattice wave digital filters refraining from the continuos-time counterparts. The multiplier coefficients are obtained in a simple algebraic form comprising the zeros and real pole of the transfer function only. The bireciprocal case represented by the transfer function with purely imaginary poles is also included. Design examples and computer simulations of wave digital lattices are presented." . "2"^^ . "\u0160im\u00E1k, Boris" . "Nen\u00ED k dispozici"@cs . . . "21230" . . . "Nen\u00ED k dispozici"@cs . "RIV/68407700:21230/05:03112391" .