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We present a model for two doubly commuting operator weighted shifts. We also investigate general pairs of operator weighted shifts. The above model generalizes the model for two doubly commuting shifts. WOT-closed algebras for such pairs are described. We also deal with reflexivity for such pairs assuming invertibility of operator weights and a condition on the joint point spectrum.

The Algebraic Multiplicity of Eigenvalues and the Evans Function Revisited

Y. Latushkin, A. Sukhtayev (2010)

Mathematical Modelling of Natural Phenomena

This paper is related to the spectral stability of traveling wave solutions of partial differential equations. In the first part of the paper we use the Gohberg-Rouche Theorem to prove equality of the algebraic multiplicity of an isolated eigenvalue of an abstract operator on a Hilbert space, and the algebraic multiplicity of the eigenvalue of the corresponding Birman-Schwinger type operator pencil. In the second part of the paper we apply this result...

The algebraic Riccati equation with Toeplitz matrices as coefficients.

Böttcher, Albrecht (2011)

ELA. The Electronic Journal of Linear Algebra [electronic only]

The algebraic structure of delay-differential systems: a behavioral perspective

Heide Glüsing-Lüerssen, Paolo Vettori, Sandro Zampieri (2001)

Kybernetika

This paper presents a survey on the recent contributions to linear time- invariant delay-differential systems in the behavioral approach. In this survey both systems with commensurate and with noncommensurate delays will be considered. The emphasis lies on the investigation of the relationship between various systems descriptions. While this can be understood in a completely algebraic setting for systems with commensurate delays, this is not the case for systems with noncommensurate delays. In the...

The algebro-geometric Toda hierarchy initial value problem for complex-valued initial data.

F. Gesztesy, H. Holden, G. Teschl (2008)

Revista Matemática Iberoamericana

The Allegretto-Piepenbrink theorem for strongly local Dirichlet forms.

Lenz, Daniel, Stollmann, Peter, Veselić, Ivan (2009)

Documenta Mathematica

The analytic theory of matrix orthogonal polynomials.

Damanik, David, Pushnitski, Alexander, Simon, Barry (2008)

Surveys in Approximation Theory (SAT)[electronic only]

The application of fixed point theorems to global nonlinear controllability problems.

K. Magnusson, A. J. Pritchard, M. D. Quinn (1985)

Banach Center Publications

The Approximation of Generalized Turning Points by Projection Methods with Superconvergence to the Critical Parameter.

G.W. Reddien, A. Greiwank (1986)

Numerische Mathematik

The arithmetic-geometric mean and its generalizations for noncommuting linear operators

Roger D. Nussbaum, Joel E. Cohen (1988)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

The associated tensor norm to $(q, p)$ -absolutely summing operators on $C (K)$ -spaces

J. A. López Molina, Enrique A. Sánchez-Pérez (1997)

Czechoslovak Mathematical Journal

We give an explicit description of a tensor norm equivalent on $C (K) \otimes F$ to the associated tensor norm $ν_{q p}$ to the ideal of $(q, p)$ -absolutely summing operators. As a consequence, we describe a tensor norm on the class of Banach spaces which is equivalent to the left projective tensor norm associated to $ν_{q p}$ .

The Atkinson theorem in Hilbert $C^{}$ -modules over $C^{}$ -algebras of compact operators.

Niknam, A., Sharifi, K. (2007)

Abstract and Applied Analysis

The $b$ -weak compactness of weak Banach-Saks operators

Belmesnaoui Aqzzouz, Othman Aboutafail, Taib Belghiti, Jawad H'michane (2013)

Mathematica Bohemica

We characterize Banach lattices on which every weak Banach-Saks operator is b-weakly compact.

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