"Thessaloniki" . . . "21260" . . "2"^^ . "A novel approach in the design 2-D extremely narrow band-stop FIR filters is introduced. The completely analytical design method is based on the 1-D optimal band-stop FIR filters which are derived from Zolotarev polynomials. The design of a 2-D filter is supported by closed form formulas. One application of a specific 2-D FIR filter with extremely narrow stop bands is presented."@en . . "2"^^ . "960-88136-0-3" . "Je uvedena metoda n\u00E1vrhu dvojdimension\u00E1ln\u00EDch \u00FAzkop\u00E1smov\u00FDch z\u00E1dr\u017E\u00ED s kone\u010Dnou impulsn\u00ED odezvou. N\u00E1vrh se op\u00EDr\u00E1 o n\u00E1mi odvozenou metodu n\u00E1vrhu jednodimension\u00E1ln\u00EDch \u00FAzkop\u00E1smov\u00FDch z\u00E1dr\u017E\u00ED. Na p\u0159\u00EDkladu jsou uk\u00E1z\u00E1ny dvojdimension\u00E1ln\u00ED \u00FAzkop\u00E1smov\u00E9 z\u00E1dr\u017Ee, kter\u00E9 mohou slou\u017Eit pro odstran\u011Bn\u00ED periodick\u00E9ho ru\u0161en\u00ED obrazu."@cs . . "Vl\u010Dek, Miroslav" . "Fast Design of 2-D Narrow Bandstop FIR Filters" . "6"^^ . "Fast Design of 2-D Narrow Bandstop FIR Filters"@en . "2004-05-06+02:00"^^ . "N\u00E1vrh 2-D filtr\u016F s kone\u010Dnou impulsn\u00ED odezvou"@cs . . . "P(OC 276.001), Z(MSM 212300014)" . . "Fast Design of 2-D Narrow Bandstop FIR Filters"@en . . . "Narrow Bandstop FIR Filters"@en . "564179" . "N\u00E1vrh 2-D filtr\u016F s kone\u010Dnou impulsn\u00ED odezvou"@cs . . . . "[E7D5EBEEABE6]" . . "RIV/68407700:21260/04:06105240!RIV07-MSM-21260___" . . "Fast Design of 2-D Narrow Bandstop FIR Filters" . "5 ; 10" . "RIV/68407700:21260/04:06105240" . . "Zahradn\u00EDk, Pavel" . "Proceedinds of the 6th COST 276 Workshop on Information and Knowledge Management for Integrated Media Communication" . . "Informatics and Telematics Institute Centre for Research and Technology, Hellas," . "Thessaloniki" . "A novel approach in the design 2-D extremely narrow band-stop FIR filters is introduced. The completely analytical design method is based on the 1-D optimal band-stop FIR filters which are derived from Zolotarev polynomials. The design of a 2-D filter is supported by closed form formulas. One application of a specific 2-D FIR filter with extremely narrow stop bands is presented." .