 Spectral integrals of operator-valued functions. II. From the study of stationary processesMilton Rosenberg Journal of Multivariate Analysis, 1976, vol. 6, issue 4, 538-571 Abstract: This paper is a continuation of the study made in [38]. Using Douglas' operator range theorem and Crimmins' corollary we obtain several new results on the "square-integrability of operator-valued functions with respect to a nonnegative hermitian measure". Using these facts we are able to extend in an important way theorems on the "spectral integral of an operator-valued function" which were obtained in [38], to wit, we are able to drop assumptions that functions are closed operator-valued. We apply these results to Wiener-Masani type infinite-dimensional stationary processes, representing a purely non-deterministic process as a "moving average" and obtaining a "factorization" of its spectral density. Next, anticipating global applications of our tools, we investigate the adjoint and generalized inverse of spectral integrals. Our definition of measurability for closed-operator-valued functions plays a key role here. Finally, we partially prove a conjecture (J. Multivariate Anal. (1974), 166-209) on simpler necessary and sufficient conditions on "when is a closed densely defined operator T from q to p a spectral integral T = f [Phi] dE?": Let q be finite and E be of countable multiplicity for . Then (i) Tx [set membership, variant] xp each x [set membership, variant] T (T is E-subordinate), and (ii) E(B)T [subset, double equals] TE(B) each B [set membership, variant] (T is E-commutative) implies LxpT [subset, double equals] TLxq each x [set membership, variant] q (T commutes with all the cyclic projections), and thus T = f [Phi] dE. Keywords: Square-integrable; Nonnegative; hermitian; measure; Linear; operator; q-variate; weakly; stationary; stochastic; process; Wold; decomposition; Adjoint; Generalized; inverse (search for similar items in EconPapers) Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:eee:jmvana:v:6:y:1976:i:4:p:538-571 Ordering information: This journal article can be ordered from Access Statistics for this article Journal of Multivariate Analysis is currently edited by de Leeuw, J. More articles in Journal of Multivariate Analysis from Elsevier |
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