Spectral radius formula for commuting Hilbert space operators

Vladimír Muller; Andrzej Sołtysiak

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Spectral decompositions and harmonic analysis on UMD spaces

Earl Berkson, T. Gillespie (1994)

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We develop a spectral-theoretic harmonic analysis for an arbitrary UMD space X. Our approach utilizes the spectral decomposability of X and the multiplier theory for $L_{X}^{p}$ to provide on the space X itself analogues of the classical themes embodied in the Littlewood-Paley Theorem, the Strong Marcinkiewicz Multiplier Theorem, and the M. Riesz Property. In particular, it is shown by spectral integration that classical Marcinkiewicz multipliers have associated transforms acting on X. ...

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L’auteur reprend l’étude classique de la représentation spectrale d’un opérateur auto-adjoint $A$ dans un espace de Hilbert $ℋ$ . Il y ajoute des précisions nouvelles qui conduisent à la définition du projecteur infinitésimal $P^{) λ)}$ sur l’espace des vecteurs propres généralisés $ℋ^{(λ)}$ . Il obtient, par conséquent, des énoncés plus précis de bien des théorèmes classiques. Il introduit ensuite la notion de “ $A$ -expansibilité” d’un sous-ensemble $S \subset ℋ$ . Cette notion est appliquée à l’étude des espaces fonctionnels...

Trace inequalities for spaces in spectral duality

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Let (A,e) and (V,K) be an order-unit space and a base-norm space in spectral duality, as in noncommutative spectral theory of Alfsen and Shultz. Let t be a norm lower semicontinuous trace on A, and let φ be a nonnegative convex function on ℝ. It is shown that the mapping a → t(φ(a)) is convex on A. Moreover, the mapping is shown to be nondecreasing if so is φ. Some other similar statements concerning traces and real-valued functions are also obtained.

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A. Pełczyński (1967)

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On an estimate for the norm of a function of a quasihermitian operator

M. Gil (1992)

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Let A be a closed linear operator acting in a separable Hilbert space. Denote by co(A) the closed convex hull of the spectrum of A. An estimate for the norm of f(A) is obtained under the following conditions: f is a holomorphic function in a neighbourhood of co(A), and for some integer p the operator $A^{p} - {(A *)}^{p}$ is Hilbert-Schmidt. The estimate improves one by I. Gelfand and G. Shilov.