O. Hermann and H. W. Schussler, "Design of nonrecursive digital filters with minimum phase," Electron. Lett., vol. 6, pp. 329--330, 1970. Home/Search Document Not in Database Summary Related Articles Check |
This paper is cited in the following contexts:
FIR Filter Design via Spectral Factorization and Convex.. - Wu, Boyd, Vandenberghe (1997) (9 citations) (Correct)
.... (see, e.g. 39, 58, 61, 57] The new variables are the autocorrelation coefficients of the filter; the filter coefficients are then recovered by spectral factorization (see 2) The idea of designing FIR filters via spectral factorization was first used by Herrmann and SchSssler in the 1970 paper [25]. Since then many authors have studied variations on and extensions of this idea, including different methods for performing the spectral factorization (see, e.g. 12, 38] and different methods for solving the transformed problem e.g. by exchange type algorithms or linear or quadratic ....
O. Herrmann and H. W. Schfissler. Design of nonrecursive digital filters with minimum-phase. Electronic Letter, 6:329-330, 1970.
FIR Filter Design via Semidefinite Programming and.. - Wu, Boyd, Vandenberghe (1996) (4 citations) (Correct)
....is not required. In this paper, we present a new way of solving the proposed class of FIR filter design problems, based on magnitude design, i.e. instead of designing the frequency response X( of the filter directly, we design its power spectrum, jX( j 2 to satisfy the magnitude bounds (see [8] and [12, ch4] Let r(n) denote r(n) 1 X k= Gamma1 x(k)x(k n) 2) where we take x(k) 0 for k 0 or k N Gamma 1. The sequence r(n) is symmetric around n = 0, zero for n GammaN or n N , and r(0) 0. Note that the Fourier transform of r(n) R( 1 X n= Gamma1 r(n)e Gammaj n ....
O. Herrmann and H. W. Schussler. Design of nonrecursive digital filters with minimum-phase. Electronic Letter, 6:329--330, 1970.
Stochastic Analysis of the ΣΔ Modulator and.. - Sharma, Bucklew.. (1997) (Correct)
No context found.
O. Hermann and H. W. Schussler, "Design of nonrecursive digital filters with minimum phase," Electron. Lett., vol. 6, pp. 329--330, 1970.
Accurate quantification of ¹H spectra: from FIR filter.. - Sundin, al. (1998) (Correct)
No context found.
. O. Herrmann and H. Schuler, Design of nonrecursive digital filters with minimum phase, Electronic Letters 6, 329--330 (1970).
Linear Matrix Inequality Formulation of Spectral Mask.. - Davidson, Luo, Sturm (2000) (4 citations) (Correct)
No context found.
O. Herrmann and W. Schuessler, "Design of nonrecursive digital filters with minimum phase", Electronics Letters,vol. 6, no. 11, pp. 329--330, 28 June 1970.
Advanced Time-Domain Methods For Nuclear Magnetic Resonance.. - Vanhamme (1999) (Correct)
No context found.
O. Herrmann and H. Schuler. Design of nonrecursive digital filters with minimum phase. Electronics Letters, 6:329--330, 1970.
Linear Matrix Inequality Formulation of Spectral Mask.. - Davidson, Luo, Sturm (2000) (4 citations) (Correct)
No context found.
O. Herrmann and W. Schuessler, "Design of nonrecursive digital filters with minimum phase", Elec- tronics Letters, vol. 6, no. 11, pp. 329 330, 28 June 1970.
Linear Matrix Inequality Formulation of Spectral Mask.. - Davidson, Luo, Sturm (2000) (4 citations) (Correct)
No context found.
O. Herrmann and W. Schuessler, "Design of nonrecursive digital filters with minimum phase", Elec- tronics Letters, vol. 6, no. 11, pp. 329 330, 28 June 1970.
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