kw.\*:("Factorisation spectrale")
Results 1 to 25 of 77
Selection :
Spectral factorization of wide sense stationary processes on Z2KOREZLIOGLU, H; LOUBATON, P.Journal of multivariate analysis. 1986, Vol 19, Num 1, pp 24-47, issn 0047-259XArticle
Linear fractional transformations and spectral factorizationGEORGIOU, T. T; KHARGONEKAR, P. P.IEEE transactions on automatic control. 1986, Vol 31, Num 4, pp 345-347, issn 0018-9286Article
Spectral factorization and Nevanlinna-Pick interpolationGEORGIOU, T. T; KHARGONEKAR, P. P.SIAM journal on control and optimization. 1987, Vol 25, Num 3, pp 754-766, issn 0363-0129Article
On diagonally weighted conformal mappingCALLIER, F. M; WINKEN, J.IEEE transactions on circuits and systems. 1985, Vol 32, Num 11, pp 1178-1181, issn 0098-4094Article
RECURSIVE ALGORITHM FOR SPECTRAL FACTORIZATION. = ALGORITHME RECURSIF POUR LA FACTORISATION SPECTRALEANDERSON BDO; HITZ KL; DIEM ND et al.1974; I.E.E.E. TRANS. CIRCUITS SYST.; U.S.A.; DA. 1974; VOL. 21; NO 6; PP. 742-750; BIBL. 24 REF.Article
Efficient algorithm for matrix spectral factorizationJEZEK, J; KUCERA, V.Automatica (Oxford). 1985, Vol 21, Num 6, pp 663-669, issn 0005-1098Article
2-D Bauer factorizationLE ROUX, J.IEEE transactions on acoustics, speech, and signal processing. 1984, Vol 32, Num 3, pp 641-643, issn 0096-3518Article
ON THE FACTORIZATION OF DISCRETE-TIME RATIONAL SPECTRAL DENSITY MATRICES. = FACTORISATION DES MATRICES DE DENSITE SPECTRALE F(Z), RATIONNELLES, EN TEMPS DISCRETDENHAM MJ.1975; I.E.E.E. TRANS. AUTOMAT. CONTROL; U.S.A.; DA. 1975; VOL. 20; NO 4; PP. 535-537; BIBL. 5 REF.Article
ON THE SPECTRAL FACTORIZATION OF NONSTATIONARY VECTOR RANDOM PROCESSES. = SUR LA FACTORISATION SPECTRALE DES PROCESSUS ALEATOIRES VECTORIELS NON STATIONNAIRESHALYO N; MCALPINE GA.1974; I.E.E.E. TRANS. AUTOMAT. CONTROL; U.S.A.; DA. 1974; VOL. 19; NO 6; PP. 674-679; BIBL. 27 REF.Article
A new procedure for stochastic realization of spectral density matricesVAN DER SCHAFT, A. J; WILLEMS, J. C.SIAM journal on control and optimization. 1984, Vol 22, Num 6, pp 845-855, issn 0363-0129Article
Singular H∞-control in terms of nonstandard J-spectral factorizationsOARA, Cristian.Proceedings of the American Control Conference. 2002, pp 2192-2193, issn 0743-1619, isbn 0-7803-7298-0, 6Vol, 2 p.Conference Paper
Computing stochastic continuous-time models from ARMA modelsSODERSTROM, T.International Journal of Control. 1991, Vol 53, Num 6, pp 1311-1326, issn 0020-7179Article
Numerical J-spectral factorization of general para-hermitian matricesSTEFANOVSKI, Jovan.Systems & control letters. 2008, Vol 57, Num 12, pp 1058-1066, issn 0167-6911, 9 p.Article
Control theoretical approach to multivariable spectral factorisation problemMOIR, T. J.Electronics letters. 2009, Vol 45, Num 24, pp 1215-1216, issn 0013-5194, 2 p.Article
Spectral factorization via Lyapunov equation based Newton-Raphson iterationKRAFFER, Ferdinand; LOISEAU, Jean J.Proceedings of the American Control Conference. 2002, pp 5126-5131, issn 0743-1619, isbn 0-7803-7298-0, 6Vol, 6 p.Conference Paper
Spectral and inner-outer factorizations through the constrained Riccati equationWEISS, M.IEEE transactions on automatic control. 1994, Vol 39, Num 3, pp 677-681, issn 0018-9286Article
A CONVERGENCE THEOREM FOR SPECTRAL FACTORIZATION.WILSON GT.1978; J. MULTIVAR. ANAL.; USA; DA. 1978; VOL. 8; NO 2; PP. 222-232; BIBL. 12 REF.Article
A CHARACTERIZATION OF MINIMAL SQUARE SPECTRAL FACTORSFINESSO L; PICCI G.1982; IEEE TRANS. AUTOMAT. CONTROL; ISSN 0018-9286; USA; DA. 1982; VOL. 27; NO 1; PP. 122-127; BIBL. 19 REF.Article
A NUMERICAL METHOD OF MATRIX SPECTRAL FACTORIZATION = METHODE NUMERIQUE DE FACTORISATION DU SPECTRE D'UNE MATRICEVOSTRY Z.1972; KYBERNETIKA; CESKOSL.; DA. 1972; VOL. 8; NO 5; PP. 448-470; ABS. TCHEQUE; BIBL. 3 REF.Serial Issue
Spectral factorization of bi-infinite multi-index block Toeplitz matricesVAN DER MEE, Cornelis V. M; SEATZU, Sebastiano; RODRIGUEZ, Giuseppe et al.Linear algebra and its applications. 2002, Vol 343-44, pp 355-380, issn 0024-3795Article
The discrete-time strictly bounded-real Lemma and the computation of positive definite solutions to the 2-D Lyapunov equationAGATHOKLIS, P; JURY, E. I; MOHAMED MANSOUR et al.IEEE transactions on circuits and systems. 1989, Vol 36, Num 6, pp 830-837, issn 0098-4094, 8 p.Article
Polynomial approach to Wiener filteringROBERTS, A. P; NEWMANN, M. M.International Journal of Control. 1988, Vol 47, Num 3, pp 681-696, issn 0020-7179Article
Transformation of J-spectral factorization of improper matrices to proper matricesSTEFANOVSKI, Jovan.Systems & control letters. 2010, Vol 59, Num 1, pp 48-49, issn 0167-6911, 2 p.Article
Constraint-selected and search-optimized families of Daubechies wavelet filters computable by spectral factorizationTASWELL, Carl.Journal of computational and applied mathematics. 2000, Vol 121, Num 1-2, pp 179-195, issn 0377-0427Article
On a Schur-algorithm based approach to spectral factorization: state-space formulaeGEORGIOU, T. T.Systems & control letters. 1988, Vol 10, Num 2, pp 123-129, issn 0167-6911Article