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細胞

Orthogonal transformation (square-root) implementations of the generalized Chandrasekhar and generaindex of nonstationarity and a corresponding generalized Levinson algorithm. It was also shown that when the nonstationary processes have constant-parameter state-space models, the generalized Levinson algorithms reduce to the generalized Chandrasekhar equations. In this paper we shall show that the

縱火

煩憂

歌唱隊

Dualite asymptotioue entre les systems de commande adaptative avec modele et les regulateurs a vari un caractère "dual" qui est une extension de la relation de "dualité" existant entre la commande à variance minimale et la commande modale dans le cas des systèmes linéaires à paramètres connus. On montre aussi que les SCAMR de type "explicite" sont équivalents aux SCAMR de type "implicite" qui uti

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提名

極為憤怒

Specification and estimation of econometric models with generalized expectations, unobserved variables is permitted. This new representation is seen to contain the various econometric proxies as special cases. Furthermore, the generalized expectations representation yields a type of nonlinear state-space model which may be estimated using the techniques already existant in the control theory literature.

Thyroiditis

Orthogonal transformation (square-root) implementations of the generalized Chandrasekhar and genera explicit equations of the above algorithms can be replaced by certain implicitly defined J-orthogonal transformation procedures, where J is a signature matrix (zero everywhere except for ±1‘s on the diagonal). In the state-space case, these methods yield the previously-derived fast square-root algorithms of Morf and Kailath.

噴油井